{"id":35813,"date":"2024-06-10T10:43:54","date_gmt":"2024-06-10T10:43:54","guid":{"rendered":"https:\/\/chineselens.com\/?p=35813"},"modified":"2025-02-03T03:29:35","modified_gmt":"2025-02-03T03:29:35","slug":"achromatic-lenses-guides","status":"publish","type":"post","link":"https:\/\/chineselens.com\/fr\/achromatic-lenses-guides\/","title":{"rendered":"Lentilles achromatiques Guides de connaissances, de co\u00fbts et de fabrication"},"content":{"rendered":"<div data-elementor-type=\"wp-post\" data-elementor-id=\"35813\" class=\"elementor elementor-35813\" data-elementor-post-type=\"post\">\n\t\t\t\t<div class=\"elementor-element elementor-element-bc4c94e e-flex e-con-boxed e-con e-parent\" data-id=\"bc4c94e\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-ecf827e elementor-widget elementor-widget-heading\" data-id=\"ecf827e\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h2 class=\"elementor-heading-title elementor-size-default\">Pr\u00e9sentation des lentilles achromatiques<\/h2>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-336463f elementor-widget elementor-widget-heading\" data-id=\"336463f\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Qu&#039;est-ce qu&#039;une lentille achromatique ? <\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-eff411e elementor-widget elementor-widget-image\" data-id=\"eff411e\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"image.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<img fetchpriority=\"high\" decoding=\"async\" width=\"1000\" height=\"700\" src=\"https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/what-is-achromatic-lens.webp\" class=\"attachment-full size-full wp-image-35862\" alt=\"qu&#039;est-ce qu&#039;une lentille achromatique\" srcset=\"https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/what-is-achromatic-lens.webp 1000w, https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/what-is-achromatic-lens-300x210.webp 300w, https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/what-is-achromatic-lens-768x538.webp 768w, https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/what-is-achromatic-lens-18x12.webp 18w\" sizes=\"(max-width: 1000px) 100vw, 1000px\" \/>\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-bac7c3d elementor-widget elementor-widget-text-editor\" data-id=\"bac7c3d\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Une lentille achromatique est un type de lentille optique con\u00e7ue pour limiter les effets de l&#039;aberration chromatique et sph\u00e9rique. L&#039;aberration chromatique se produit lorsque diff\u00e9rentes longueurs d&#039;onde de lumi\u00e8re sont r\u00e9fract\u00e9es selon des quantit\u00e9s diff\u00e9rentes, ce qui emp\u00eache la focalisation de toutes les couleurs sur le m\u00eame point de convergence. Il en r\u00e9sulte une image floue avec des franges de couleur sur les bords. Les lentilles achromatiques sont con\u00e7ues pour mettre au point deux longueurs d&#039;onde, g\u00e9n\u00e9ralement le rouge et le bleu, dans le m\u00eame plan, r\u00e9duisant ainsi consid\u00e9rablement l&#039;aberration chromatique.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-20964b2 elementor-widget elementor-widget-heading\" data-id=\"20964b2\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Composition<\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-862e7e9 elementor-widget elementor-widget-text-editor\" data-id=\"862e7e9\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Les lentilles achromatiques sont g\u00e9n\u00e9ralement fabriqu\u00e9es en combinant deux types de verres aux propri\u00e9t\u00e9s de dispersion diff\u00e9rentes :<\/p><ol class=\"list-decimal marker:font-mono marker:text-sm pl-11\"><li><strong>Verre couronne<\/strong>: Un type de verre \u00e0 faible dispersion.<\/li><li><strong>Verre de silex<\/strong>: Un type de verre \u00e0 haute dispersion.<\/li><\/ol><div>\u00a0<\/div><p>Ces deux \u00e9l\u00e9ments ou plus sont ciment\u00e9s ensemble pour former une lentille doublet. La combinaison de ces mat\u00e9riaux aide \u00e0 contrecarrer la dispersion de la lumi\u00e8re, minimisant ainsi efficacement l&#039;aberration chromatique.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-17984d5 elementor-widget elementor-widget-heading\" data-id=\"17984d5\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Avantages<\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-ec79b30 elementor-widget elementor-widget-text-editor\" data-id=\"ec79b30\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<ul class=\"list-disc pl-8\"><li><strong>Qualit\u00e9 d&#039;image am\u00e9lior\u00e9e<\/strong>: En r\u00e9duisant l&#039;aberration chromatique, les lentilles achromatiques fournissent des images plus claires et plus nettes.<\/li><li><strong>Rentable<\/strong>: Par rapport aux syst\u00e8mes de lentilles plus complexes, les lentilles achromatiques offrent un bon \u00e9quilibre entre performances et co\u00fbt.<\/li><li><strong>Polyvalence<\/strong>: Convient \u00e0 une large gamme d\u2019applications optiques.<\/li><\/ul>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-a0a5686 e-flex e-con-boxed e-con e-parent\" data-id=\"a0a5686\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-a52b2d6 elementor-widget elementor-widget-heading\" data-id=\"a52b2d6\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h2 class=\"elementor-heading-title elementor-size-default\">Comment fonctionne la lentille achromatique ?<\/h2>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-c5306d7 elementor-widget elementor-widget-heading\" data-id=\"c5306d7\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Aberration chromatique<\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-ced0abd elementor-widget elementor-widget-text-editor\" data-id=\"ced0abd\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>L&#039;aberration chromatique se produit parce que diff\u00e9rentes longueurs d&#039;onde (couleurs) de la lumi\u00e8re se r\u00e9fractent ou se courbent selon des quantit\u00e9s diff\u00e9rentes lorsqu&#039;elles traversent une lentille. Cela am\u00e8ne chaque couleur \u00e0 se concentrer en diff\u00e9rents points le long de l&#039;axe optique, ce qui donne une image floue avec des franges de couleur.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-99b2dc7 elementor-widget elementor-widget-heading\" data-id=\"99b2dc7\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Principe de fonctionnement<\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-ce16dab elementor-widget elementor-widget-text-editor\" data-id=\"ce16dab\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>La cl\u00e9 de la fonctionnalit\u00e9 d\u2019une lentille achromatique r\u00e9side dans la combinaison de ces deux \u00e9l\u00e9ments. Voici comment cela fonctionne:<\/p><ol class=\"list-decimal marker:font-mono marker:text-sm pl-11\"><li><strong>R\u00e9fraction par Crown Glass<\/strong>: Lorsque la lumi\u00e8re p\u00e9n\u00e8tre dans la lentille en verre de la couronne, elle se r\u00e9fracte et commence \u00e0 se concentrer. Cependant, en raison de sa faible dispersion, diff\u00e9rentes longueurs d&#039;onde de lumi\u00e8re (par exemple, le rouge et le bleu) se concentreront toujours sur des points l\u00e9g\u00e8rement diff\u00e9rents.<\/li><li><strong>Correction par Flint Glass<\/strong>: La lumi\u00e8re traverse ensuite la lentille en verre de silex. Parce que le verre silex a une dispersion plus \u00e9lev\u00e9e, il courbe davantage la lumi\u00e8re. La courbure n\u00e9gative de la lentille en verre silex contrecarre la courbure positive de la lentille en verre couronne.<\/li><li><strong>Converger vers un objectif commun<\/strong>: La combinaison de ces deux lentilles garantit que deux longueurs d&#039;onde de lumi\u00e8re (g\u00e9n\u00e9ralement rouge et bleue) convergent vers le m\u00eame point focal. Cela r\u00e9duit consid\u00e9rablement l&#039;aberration chromatique, ce qui donne une image plus claire.<\/li><\/ol>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-ce9d3ee elementor-widget elementor-widget-heading\" data-id=\"ce9d3ee\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Explication du diagramme<\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-5b2fd04 elementor-widget elementor-widget-image\" data-id=\"5b2fd04\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"image.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<img decoding=\"async\" width=\"800\" height=\"626\" src=\"https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/how-achromatic-lens-works.webp\" class=\"attachment-large size-large wp-image-35975\" alt=\"comment fonctionne la lentille achromatique\" srcset=\"https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/how-achromatic-lens-works.webp 920w, https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/how-achromatic-lens-works-300x235.webp 300w, https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/how-achromatic-lens-works-768x601.webp 768w, https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/how-achromatic-lens-works-15x12.webp 15w\" sizes=\"(max-width: 800px) 100vw, 800px\" \/>\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-9678b66 elementor-widget elementor-widget-text-editor\" data-id=\"9678b66\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Pour visualiser cela, imaginez un faisceau de lumi\u00e8re blanche (qui contient toutes les couleurs) entrant dans la lentille achromatique\u00a0:<\/p><ul class=\"list-disc pl-8\"><li>La lentille en verre couronne plie la lumi\u00e8re, provoquant la mise au point de diff\u00e9rentes couleurs \u00e0 diff\u00e9rents points.<\/li><li>La lentille en verre de silex plie ensuite la lumi\u00e8re dans la direction oppos\u00e9e, ramenant les diff\u00e9rentes couleurs vers un point focal commun.<\/li><\/ul>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-06f408d e-flex e-con-boxed e-con e-parent\" data-id=\"06f408d\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-125159e elementor-widget elementor-widget-heading\" data-id=\"125159e\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h2 class=\"elementor-heading-title elementor-size-default\">Types de lentilles achromatiques<\/h2>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-df658a5 elementor-widget elementor-widget-heading\" data-id=\"df658a5\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Lentilles achromatiques positives <\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-43798b1 elementor-widget elementor-widget-text-editor\" data-id=\"43798b1\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<div class=\"auto-hide-last-sibling-br paragraph_1252f paragraph-element\"><img decoding=\"async\" class=\"alignleft\" style=\"text-align: var(--text-align); font-size: 1rem;\" src=\"data:image\/png;base64,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\" alt=\"Lentilles achromatiques positives \" width=\"103\" height=\"127\" \/>Les lentilles achromatiques positives sont des lentilles optiques con\u00e7ues avec pr\u00e9cision pour corriger l&#039;aberration chromatique caus\u00e9e par diff\u00e9rentes longueurs d&#039;onde de lumi\u00e8re. Ils sont g\u00e9n\u00e9ralement cr\u00e9\u00e9s en liant soigneusement deux types de mat\u00e9riaux en verre avec des indices de r\u00e9fraction et des taux de dispersion variables, dans le but de concentrer la lumi\u00e8re de diff\u00e9rentes longueurs d&#039;onde sur le m\u00eame plan, r\u00e9duisant ou \u00e9liminant ainsi l&#039;aberration chromatique.<\/div>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-8db43c2 elementor-widget elementor-widget-text-editor\" data-id=\"8db43c2\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p><strong>Structure et principe<\/strong><\/p><p>Une lentille achromatique positive est g\u00e9n\u00e9ralement un doublet, compos\u00e9 d&#039;un \u00e9l\u00e9ment positif \u00e0 faible indice de r\u00e9fraction (tel qu&#039;un verre couronne) et d&#039;un \u00e9l\u00e9ment n\u00e9gatif \u00e0 indice de r\u00e9fraction \u00e9lev\u00e9 (tel qu&#039;un verre silex). Cette combinaison permet de neutraliser l&#039;aberration chromatique d&#039;un objectif par l&#039;autre, obtenant ainsi la correction de l&#039;aberration chromatique.<\/p><p><strong>Applications<\/strong><\/p><p>Ces lentilles sont largement utilis\u00e9es en microscopie \u00e0 fluorescence, en relais d&#039;images, en d\u00e9tection et en spectroscopie, entre autres. Ils offrent des distances focales presque constantes sur une large plage de longueurs d&#039;onde et, compar\u00e9s aux objectifs simples, ils produisent des points lumineux plus petits et une image plus claire.<\/p><p><b>Avantages<\/b><\/p><ul><li>Correction de l&#039;aberration chromatique\u00a0: focalise efficacement deux longueurs d&#039;onde principales de la lumi\u00e8re, r\u00e9duisant consid\u00e9rablement l&#039;aberration chromatique.<\/li><li>Qualit\u00e9 d&#039;image am\u00e9lior\u00e9e\u00a0: offre une image plus claire et des points lumineux plus fins par rapport aux objectifs simples.<\/li><li>Diverses options de rev\u00eatement\u00a0: offre une s\u00e9lection de rev\u00eatements tels que VIS, NIR, SWIR pour r\u00e9pondre \u00e0 divers besoins d&#039;application.<\/li><\/ul><div>\u00a0<\/div><p><b>Fabrication et mat\u00e9riaux<\/b><\/p><p>La cr\u00e9ation de lentilles achromatiques positives implique la liaison pr\u00e9cise de deux mat\u00e9riaux s\u00e9lectionn\u00e9s, g\u00e9n\u00e9ralement le verre N-BK7 et SF5. Les param\u00e8tres de conception de la lentille, notamment le rayon de courbure, l&#039;\u00e9paisseur centrale et autres, sont m\u00e9ticuleusement calcul\u00e9s pour garantir des performances optiques optimales.<\/p><p><b>Sp\u00e9cifications typiques (exemple)<\/b><\/p><ul><li>Diam\u00e8tre : 50,80 mm<\/li><li>Distance focale effective (EFL) : 150,00 mm<\/li><li>Rev\u00eatement\u00a0: rev\u00eatement antireflet AR@400-700\u00a0nm<\/li><li>Mat\u00e9riaux\u00a0: N-BK7\/SF5<\/li><li>Distance focale arri\u00e8re (BFL) : 140,40 mm<br \/>Rayon de courbure (R1\/R2\/R3) : 83,20 mm, -72,10 mm, -247,70 mm respectivement<\/li><li>\u00c9paisseur centrale (CT) : 15,00 mm<\/li><li>Qualit\u00e9 de surface\u00a0: varie de 40-20 \u00e0 60-40 selon les sp\u00e9cifications<\/li><\/ul><p>\u00a0<\/p><p>Gr\u00e2ce \u00e0 leurs capacit\u00e9s d&#039;imagerie de pr\u00e9cision et de correction de l&#039;aberration chromatique, les lentilles achromatiques positives sont des composants indispensables dans les syst\u00e8mes optiques avanc\u00e9s, en particulier dans les applications o\u00f9 la qualit\u00e9 de l&#039;image est d&#039;une importance primordiale.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-183dfe8 e-flex e-con-boxed e-con e-parent\" data-id=\"183dfe8\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-a1e46ce elementor-widget elementor-widget-heading\" data-id=\"a1e46ce\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Lentilles achromatiques n\u00e9gatives <\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-50b540c elementor-widget elementor-widget-text-editor\" data-id=\"50b540c\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p><img loading=\"lazy\" decoding=\"async\" class=\"alignright\" style=\"text-align: var(--text-align); font-size: 1rem;\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJAAAADWCAYAAAA+RwvJAAAMPmlDQ1BJQ0MgUHJvZmlsZQAASImVVwdYU8kWnluSkEBoAQSkhN4EESkBpITQQu9NVEISIJQYA0HFji4quHaxgA1dFVGw0iwoYmdR7H2xoKCsiwW78iYFdN1Xvne+b+797z9n\/nPm3LllAFA7wRGJclF1APKEBeKYID96UnIKndQDEEACVGAA3DncfBEzKioMQBs6\/93e3YDe0K7aS7X+2f9fTYPHz+cCgERBnM7L5+ZBfAgAvJIrEhcAQJTyZlMLRFIMG9ASwwQhXiTFmXJcKcXpcrxP5hMXw4K4DQAlFQ5HnAmA6mXI0wu5mVBDtR9iRyFPIARAjQ6xd17eZB7EaRBbQx8RxFJ9RvoPOpl\/00wf1uRwMoexfC4yU\/IX5ItyOdP\/z3L8b8vLlQzFsIRNJUscHCOdM6zbrZzJoVKsAnGfMD0iEmJNiD8IeDJ\/iFFKliQ4Xu6PGnDzWbBmQAdiRx7HPxRiA4gDhbkRYQo+PUMQyIYYrhB0mqCAHQexLsSL+PkBsQqfLeLJMYpYaH2GmMVU8Oc4YllcaawHkpx4pkL\/dRafrdDHVIuy4hIhpkBsXihIiIBYFWKH\/JzYUIXPuKIsVsSQj1gSI83fHOIYvjDIT66PFWaIA2MU\/qV5+UPzxbZkCdgRCnygICsuWF4frI3LkeUP54Jd5guZ8UM6\/PyksKG58Pj+AfK5Yz18YXysQueDqMAvRj4Wp4hyoxT+uCk\/N0jKm0LsnF8YqxiLJxTABSnXxzNEBVFx8jzxomxOSJQ8H3w5CAMs4A\/oQAJbOpgMsoGgo6+hD17JewIBB4hBJuADewUzNCJR1iOEx1hQBP6EiA\/yh8f5yXr5oBDyX4dZ+dEeZMh6C2UjcsBTiPNAKMiF1xLZKOFwtATwBDKCf0TnwMaF+ebCJu3\/9\/wQ+51hQiZMwUiGItLVhjyJAUR\/YjAxkGiD6+PeuCceBo++sDnhDNx9aB7f\/QlPCZ2ER4TrhC7C7UmCYvFPWYaDLqgfqKhF+o+1wC2hpgvuh3tBdaiM6+D6wB53hnGYuA+M7AJZliJvaVXoP2n\/bQY\/3A2FH9mRjJJHkH3J1j+PVLVVdRlWkdb6x\/rIc00frjdruOfn+Kwfqs+D59CfPbFF2EHsLHYSO48dxRoAHWvBGrF27JgUD6+uJ7LVNRQtRpZPDtQR\/CPe0J2VVjLfscax1\/GLvK+AP036jgasyaLpYkFmVgGdCb8IfDpbyHUYRXdydHIGQPp9kb++3kTLvhuITvt3bv4fAHi1DA4OHvnOhbQAsN8NPv5N3zlrBvx0KANwrokrERfKOVx6IMC3hBp80vSAETAD1nA+TsAVeAJfEABCQCSIA8lgIsw+C65zMZgKZoJ5oASUgeVgDdgANoNtYBfYCw6ABnAUnARnwEVwGVwHd+Hq6QYvQD94Bz4jCEJCqAgN0UOMEQvEDnFCGIg3EoCEITFIMpKGZCJCRILMROYjZchKZAOyFalG9iNNyEnkPNKJ3EYeIr3Ia+QTiqEqqBZqiFqio1EGykRD0Th0ApqJTkGL0AXoUnQdWoXuQevRk+hF9Drahb5ABzCAKWM6mAlmjzEwFhaJpWAZmBibjZVi5VgVVos1w\/t8FevC+rCPOBGn4XTcHq7gYDwe5+JT8Nn4EnwDvguvx9vwq\/hDvB\/\/RqASDAh2BA8Cm5BEyCRMJZQQygk7CIcJp+Gz1E14RyQSdYhWRDf4LCYTs4kziEuIG4l1xBPETuJj4gCJRNIj2ZG8SJEkDqmAVEJaT9pDaiFdIXWTPigpKxkrOSkFKqUoCZWKlcqVdisdV7qi9EzpM1mdbEH2IEeSeeTp5GXk7eRm8iVyN\/kzRYNiRfGixFGyKfMo6yi1lNOUe5Q3ysrKpsruytHKAuW5yuuU9ymfU36o\/FFFU8VWhaWSqiJRWaqyU+WEym2VN1Qq1ZLqS02hFlCXUqupp6gPqB9UaaoOqmxVnuoc1QrVetUrqi\/VyGoWaky1iWpFauVqB9UuqfWpk9Ut1VnqHPXZ6hXqTeo31Qc0aBpjNCI18jSWaOzWOK\/Ro0nStNQM0ORpLtDcpnlK8zENo5nRWDQubT5tO+00rVuLqGWlxdbK1irT2qvVodWvrantrJ2gPU27QvuYdpcOpmOpw9bJ1Vmmc0Dnhs6nEYYjmCP4IxaPqB1xZcR73ZG6vrp83VLdOt3rup\/06HoBejl6K\/Qa9O7r4\/q2+tH6U\/U36Z\/W7xupNdJzJHdk6cgDI+8YoAa2BjEGMwy2GbQbDBgaGQYZigzXG54y7DPSMfI1yjZabXTcqNeYZuxtLDBebdxi\/JyuTWfSc+nr6G30fhMDk2ATiclWkw6Tz6ZWpvGmxaZ1pvfNKGYMswyz1WatZv3mxubh5jPNa8zvWJAtGBZZFmstzlq8t7SyTLRcaNlg2WOla8W2KrKqsbpnTbX2sZ5iXWV9zYZow7DJsdloc9kWtXWxzbKtsL1kh9q52gnsNtp1jiKMch8lHFU16qa9ij3TvtC+xv6hg45DmEOxQ4PDy9Hmo1NGrxh9dvQ3RxfHXMftjnfHaI4JGVM8pnnMaydbJ65ThdO1sdSxgWPnjG0c+8rZzpnvvMn5lgvNJdxloUury1dXN1exa61rr5u5W5pbpdtNhhYjirGEcc6d4O7nPsf9qPtHD1ePAo8DHn952nvmeO727BlnNY4\/bvu4x16mXhyvrV5d3nTvNO8t3l0+Jj4cnyqfR75mvjzfHb7PmDbMbOYe5ks\/Rz+x32G\/9ywP1izWCX\/MP8i\/1L8jQDMgPmBDwINA08DMwJrA\/iCXoBlBJ4IJwaHBK4Jvsg3ZXHY1uz\/ELWRWSFuoSmhs6IbQR2G2YeKw5nA0PCR8Vfi9CIsIYURDJIhkR66KvB9lFTUl6kg0MToquiL6acyYmJkxZ2NpsZNid8e+i\/OLWxZ3N946XhLfmqCWkJpQnfA+0T9xZWJX0uikWUkXk\/WTBcmNKaSUhJQdKQPjA8avGd+d6pJaknpjgtWEaRPOT9SfmDvx2CS1SZxJB9MIaYlpu9O+cCI5VZyBdHZ6ZXo\/l8Vdy33B8+Wt5vXyvfgr+c8yvDJWZvRkemWuyuzN8skqz+oTsAQbBK+yg7M3Z7\/PiczZmTOYm5hbl6eUl5bXJNQU5gjbJhtNnja5U2QnKhF1TfGYsmZKvzhUvCMfyZ+Q31igBX\/k2yXWkl8kDwu9CysKP0xNmHpwmsY04bT26bbTF09\/VhRY9NsMfAZ3RutMk5nzZj6cxZy1dTYyO3126xyzOQvmdM8NmrtrHmVezrzfix2LVxa\/nZ84v3mB4YK5Cx7\/EvRLTYlqibjk5kLPhZsX4YsEizoWj128fvG3Ul7phTLHsvKyL0u4Sy78OubXdb8OLs1Y2rHMddmm5cTlwuU3Vvis2LVSY2XRyserwlfVr6avLl39ds2kNefLncs3r6WslaztWhe2rnG9+frl679syNpwvcKvoq7SoHJx5fuNvI1XNvluqt1suLls86ctgi23tgZtra+yrCrfRtxWuO3p9oTtZ39j\/Fa9Q39H2Y6vO4U7u3bF7Gqrdquu3m2we1kNWiOp6d2TuufyXv+9jbX2tVvrdOrK9oF9kn3P96ftv3Eg9EDrQcbB2kMWhyoP0w6X1iP10+v7G7IauhqTGzubQppamz2bDx9xOLLzqMnRimPax5YdpxxfcHywpahl4IToRN\/JzJOPWye13j2VdOpaW3Rbx+nQ0+fOBJ45dZZ5tuWc17mj5z3ON11gXGi46Hqxvt2l\/fDvLr8f7nDtqL\/kdqnxsvvl5s5xncev+Fw5edX\/6plr7GsXr0dc77wRf+PWzdSbXbd4t3pu595+dafwzue7c+8R7pXeV79f\/sDgQdUfNn\/Udbl2HXvo\/7D9Ueyju4+5j188yX\/ypXvBU+rT8mfGz6p7nHqO9gb2Xn4+\/nn3C9GLz30lf2r8WfnS+uWhv3z\/au9P6u9+JX41+HrJG703O986v20diBp48C7v3ef3pR\/0Puz6yPh49lPip2efp34hfVn31eZr87fQb\/cG8wYHRRwxR\/YrgMGGZmQA8HonANRkAGhwf0YZL9\/\/yQyR71llCPwnLN8jyswVgFr4\/x7dB\/9ubgKwbzvcfkF9tVQAoqgAxLkDdOzY4Ta0V5PtK6VGhPuALcFf0\/PSwb8x+Z7zh7x\/PgOpqjP4+fwvAiV8bvXSQ1sAAABsZVhJZk1NACoAAAAIAAQBGgAFAAAAAQAAAD4BGwAFAAAAAQAAAEYBKAADAAAAAQACAACHaQAEAAAAAQAAAE4AAAAAAAAAkAAAAAEAAACQAAAAAQACoAIABAAAAAEAAACQoAMABAAAAAEAAADWAAAAAIKmTmcAAAAJcEhZcwAAFiUAABYlAUlSJPAAADnmSURBVHgB7Z1r0yTHcZ17gd0FFneAxJ0X0Q7xAoqkbMv+6A8ORdgfHAqFLf8i\/xjLIVP+Hw5HSCTFmyRTFEmAAEHcdwEsdoF1PuecrOp5d+kAscLb0\/TUvN2VlXnyZE11ZU1PT8+8F25VWU7lNAKfcATu+YR+J7fTCGgEThPoNBHuagROE+iuhu\/kfJpApzlwVyNwmkB3NXwn59MEOs2BuxqB0wS6q+E7OZ8m0GkO3NUInCbQXQ3fyfk0gU5z4K5G4DSB7mr4Ts6nCXSaA3c1AqcJdFfDd3I+TaDTHLirEThNoLsavpPzaQKd5sBdjcBpAt3V8J2cTxPoNAfuagROE+iuhu\/kfJpApzlwVyNwmkB3NXwn54tbDsEPXnl7y\/BHF\/unr7+7\/N4TD3ysfr3w9CMfC\/dpgzabQH\/xnReXb3\/3xeVzj11ZLlzop2lhNEutbx1Fsdbb43ZNM1HDy5eWVNOuje8wUX9Uhm5X8zeXdsiXn1Ldhkd\/8A2pUtwJO3TDbs3V6x8u1z64eRvvb6v4\/ScfWv7rf3jht3X7xPjNJtB\/+dbzy+vvfrC8cf3G8q3nH\/+NT2A94Bzx+S02LBfmBAuw8Y271YexDMNGtALQPosb7eB7UgzfM35MRNNNPvNa\/5Eby0cCeeIiSl89oH7\/xofLP75+bfn3LzyriY0LvFC\/d+Pm8lE5f1gNdB\/aEYrbyucfe2D5q5+\/fpv+01RsNoF4Uk88cHk8NwbLKwbD12tD1zn4mGIGH62qXqmsx5YiRU00ORZUfrPGuamoz06Ytk+\/OVEUoQz2c7z2R2ne5k+9jhHHf\/j11eUbzz+23PjwI00SJoo3+pMeWLCCxKnHhTP1r66+706c437Tk2hWIcp3XnxzvIxdqFnERGKnmsmEnAdNJhg222kjB0F9aAAOIhtyldG0H23cHB9dl+ZNe8RpDsdTyPiLvAlGnTi4df\/K9v7Nj5Z77rmwPHblktyI4uh2ZK+2Oidn4cRRxoO6kLyEnWfZdAXiibIK9XjSJtF09EoYZynKQqxdygZuVZzfNaLyOzCkccZhQKLvGPFfoyW34rbakUd\/WvgNOMK2CYHV5198\/nHrYgjj6KE84MUejIW5EtG+7+I9y5XazrOcb7Q7PLM\/0yp0QasQ5ploZHYrnL3O3ORkZ5+cmHPKUxGMDGcmGh7r5ETtMgAjHv5mM0r76Nyn8qRNI\/VaLyKbFH\/tT0y1q37\/5ofieKRWH3NhhRKEeyBwYliWCZCIhl+1X377veXrzzwMxbmVzVcghurxGsA+d\/C5TGmVyVidctp3Bra507H0vQI1j0dQBom2hxa0CDFFCLT9hznMjceOrdsI63b7oxTHqLsH+Mqy\/OTVq8u\/+uIT4pLO6tiDx58Y+GCX71x5QDHVqB+4eC9P6FzL5isQz\/bPvulzoe\/qXCi5r6zDWrMFOQ+a6JSAkmlLIxMZ6Qy21srINOKDv+UImLTZH61LImNDAT8PGtqQZ9srQsDBULWfxQv17sqrz2NX\/BI++ERrR\/sRpiQAUrt2HNRuP3D54vLzN9+F\/lzLUUwgxoBV6O33bijBOtGolXZKPnLMmqHrplG2draufGMYXJimK1JtqRA62cGNEshwbHziaWGQDmDAwVCh6\/7TZvX5l194vN6WfyT4jK8eKKz95Dw50+wYY2WSx7Kc9wXGo5hAPHe9I6uJ9Kt33l8n2sg8slDZZquy0e1ydhLKokwf6TwNyuLmKHtZUpAmDtlJHf2AOf6kdrvjrfUhUCU7HIrpqO994NXHlzEcT\/buirDqibpmm\/soBuHSJrD\/lkv3nv\/hPP+IfUDO1EyGP3z2UZ0IKoHJWGVw7ZK9zjYpnYACFJEgzvBxvtApDUZ\/7SdwuOlEVgarS0\/c6MKhVuvP1BDZZ\/YDnWIqJN7YmnNZXq3rNX9U5z43fZXRcPFMDqPNI9\/B2dxnamJsUI5mAvHceUf2vZfeIuGcsdRKr8rSPGiiU+JJpg08CGoRWG+gEKCijNhc6PnTZn+ZhG7euI44zRE8DvG30PiuzXP\/pXuXn752bXny4fsUD6vjIhgLkoaavROowfiUgb\/UD1y+d7lY15POuxzVBOLJ\/+kfPLd898U3nLFO3ZG9yeVClUQCyu4hG\/mtTD4wAJdPBDuMPcba+JMI94wEDLV3Z+o1XjL2CHJa493Dq+\/fWB6va1836gJic7bLaEtIH8RzB06c+Ev966sfVLDzL0c1gcif\/\/SN52oVeluZRXJ1eip\/rUAZdTKuKtkZv8LMFUgGjLJrjwsYsCpSGNM22aMvjLDRVWUFbRqp13p0ihkslWNeWH70yjvLv\/7iZ+qjikEsuHmsg7cfCp62OMVlPsdwLFa2874KTVeOagJpbGo8\/u2XPlMXFt8YKwKCHso2Z6NF5Cpkoh7OSGXlNAy7UHIvtGnsbALpfD4z2GTv2KOmP9nUN8npB8TaXIVajWvX\/Wn7Ew\/yGSAcVaU23+RQrHYWP7yiSd1t1yiv\/P96HYhh7HJPZRtLvDLQqTuyFx1\/7JTkku3pjAWKrQ3Bx0fOMQlyRm9O+wfmWB1PoR1p+JfgmII6tojcnl2+sPz9r9\/RybMnOH4iVC2X0bfEsJknFV6JfhqJoedafrx7Pe+r0HTv6FYgOvWfv1kvY3VRsXKrSjKtah4u0XXTKFs7WwU0Lgaj4jNdkQ5xWUDEMHaBrLsgOfHw6XavQG5bfX99RsW0eKpOnoGOmNVqX9VY4DRicEqz7gNg\/lLDuEU5ygnEQP\/pN3hH9qZTrjJMOamUJU2lcFYyam5SCe8VaOJsd9sZC1uXQ5wilcqIiepVYHahEFoFXK\/1YBVT1GZ6+e33l4v3XtBbd7OC8WZfeFplH+0Bl0EP7HQ7OsewkouwW5TjnEA1Jl958sHl7XdrUJRh5F89IpN6FsnTKsnExvglApsMrpDlZx3+UqFDsFoxvAI0wHbpyulsTUes63BNVJSiEPvys7pd9Q8\/93jdHOb27X2Bxz4dX8jmUJzmpAY864p+7lehiXmUE6gH42dv8NkOGZYMlIy12lbTUGE1cJZiK2MXAWmgW+u7aT9M5rT\/RNo+KEvQo+loazOfY0NWbUrV9+fk9qmH73eMGMyJv3Fu04\/EiD8A8UI7sDSMHbHEe767o51A3GT1J19\/tl7Gck1I6wTpSJnZ6rY0JCQp6eycBowYsrWh6+irIqnbH7GL5Fasa+TEs6\/birXC\/bJus+DKc3\/uZVPtJfi5IItDFFp72uwYAgwXg+VT777qLfwv3nyvu3uu9dFOIBLta08\/vLzzfr317Yzs9KuUQ3S2F1DJSNYiJ1uRbRh2BFME25jghg0OdNqyj84YTHCpE6rXegWxSc68fFGYL15daAGQQnB2oRsY9aExBZY9rt1ovi995kEs516OdgIxEi\/UBPrHuuyvLK\/h9+s+h8FZqzZAMlEPoMGht2HYhZK7\/THLGBwrQPvD1zZxw8sj\/F2XIrqEM4lcEe\/LB5xP8+6r+QmbmPanCY+qqhVJ8YDJptjy0g6MKIRdNvkYg2dx1BOIDv5JfbTxvV\/W52N5KGs7G8nOFNuT4VoOMHSWR+42FmX2od4rAJkOW5dEDhWOerQ\/bW2QOr7IY\/9lvfvSy1cd74INk8GOjx6DaomJYbNtRMU\/OmJ2vDc3egdGV456AnFR8atPPbS8w31CedBpp17tyc4UJSoyGTkMzlIyVT5KWWS3pnSIw10uBgzYoEFDQ5vjKWTa6ljs\/fLFtywU3pWdwUhJBQ9tRJ6tLN7Jx\/Z26RhgWeW2+BiDvh71BKKDLzzzyMK7MeWkUlTpOrIPjDLRVclkajArA\/4Anblu4SrnFc4Y7WMTqBT2ndQrLtmaipWBrV6+coP707z7gkamjq3GwJo\/TfgEbwyuxBOFd2n0SrTFxxg8paOfQHTwP37tGb0b8+u+c5NsHStNZPJW2atUNm5kanK6OQYEH2ziMKc4UGRb8zZ\/1\/BbNhy5Y770lt99sfoMNXJBVwFlY3eIAddclmUfrtgIdWt5670PNvkYg64c\/QQiw75W3zR44OJFZaFSs7ORNE0B5ywlUw8M67RteLKYpv3gVVLDI66G2j4oZQMjVzkJn7ZjQ7bo4iEsTBjwY0OpgK7NZU7RlMIPw3DUw7R2FRmceGxXjn4CMTQvPPXI8r9+9rozUmM1s7WHLvlKSiorW6+jxxGcwjBZwEgqy1U7rSgr1HBHp0Zq5MRjdXAIC5frvOS1a9cXXr6EKXPHMEXtJaQWT6t4Ni0j+NkRo13Qme\/W8sa1be4F4intYgLR0X\/+2QfrVlAGSjmabE72KTPJUcxVj6yUwRm78hMGrApexskt\/mYT4+QtyRhcEqfxoRGgdG\/X9SvuKtBUAEMswrTshnhkFI+b4hZcDlLCUBBBG0\/dz\/W8b6bn6VB2MYHuravSX6+fM3mlrugq8zgsJCA7ipIxWVu6obdh2BHkIoz9ZAwOm1Yf7OiyqRXdsItDDvFJP0yyXK0fjfg3v\/cZxbPPtMMs7mAdxn2zyvHVh2DcB\/cIvJ5jasZnq7KLCcTg8Hb+jfo1j05BZeNq3JShhVOGY1QhRVHSiCAZ3O16c5LpsHUxs2yoZAODnDa6tLUiVKPfvttlbbeb9gpSu8FTIk348hg22oGicxzXW32MwXPb\/JupdOLjFN7O867GhdRLNk5NTMrbqS1cDHeqShfACnfrFt\/0PFNKIV0bRu14LBQqJVzut++P3K\/Pv0ZfC6MFxcBJiG8ZUklvOhywyaGrtFH6G6lbfYxBr3azAjFYf\/zlp5ZX37mugRtZyLNIZlZFSjo7Ua4MZDTtXiGEBX8GZ4z2sQlUCvuyCthlxSXb1PO9r37rrrjYoamdV5fREO\/gAxJ+4csgvBvmiKuApX+wvpG6ZdnNBKp7sXRbxCvvsApVtpKc7CiRyeE+R3GaymC78td2ZTuucpdXOKpiJdBq0ADbh77tqc2Fz+zHT+oXNzj\/gXT6TbvCEhwnbdjMYVVirv0lwzh5aPAjXVt8nYduUHYzgejs156ujzX4dF6ZmWzFUMWZ3RmblLUBOIhsyFVGk9WhGvxpC4dRAgoBnqLVBAxy2ujSph+v1UF9pl6+KF5B1na7aS\/O2g0e8GyKWOqVjVaaUqeB61YfY\/D8djWBuB7kk9OZrTwJinMWAZvyVHqlbKet89f6scdYG38S7Y\/YRXIr1jVy4tl3WS7XUnnpnnsctuz0SxjILMrmRivD42ri5WC\/IKnkqs6K36qt9ruaQGTeH3\/F50GdqRo4ZabyVSlMBrvIoAy31VlMKjdCRqW0XId\/4+ERVj7tjxIZfteIAN\/N+Q\/HXmZxm81i5OgDMo9ph3zA3f2oGtf2e7M+xvijzz2GdpOyqwl0bx2R++sK7yv1FRYyfqw0ykTlunRDv8rgWOXHrleMpLOq5tR5i9aJIq5aD3x4yHfW5qIt6NLnP8a6j\/ax3dwcaz0BABLN46ZkQVZxFNtQu9rvYq12W5Zto3+CZ\/7VusmMH1JSdpOJKeS1E7NqLQcYSiNl5G5juYPenPbH7GJm2VCUoEf709aGbdEVaPs5hm1gbKdG1F66KMJhHBGMEd5KcUiPiwwCbbrb3wR66uHlf\/NTtkngHr1qolIKk+UugNDRiiA5KoFW+uB6UZC5d2WL2Zq4eeXwCsTnX\/xkr06gwcsnAl5D1w10pVSTNSvNqHAQR0OMFE\/I9Ul8q7eot72I8AmeMTeZdfaSp5osZGQPctlB9HFpw4VcHMQd6IUC2AW0FK4LpxDjYmKIw6uDagfHwVVt4\/iOus1ZRUpdVO5Q1dIqthrpa4HgL333LyRq67ImEKMT0FF5Wd\/qczD6uLsJRKf\/3ZefrK\/yXl+efOg+mpoRPZHGxLHFB64GvqdL27vGWYeeAw1VDNKJw\/bGYzcuAVZtfmneFxBN1nxrfPsrGjCIA5C4kskC4TEUiL1KCbQyRVu7Sb27lzBWIO6+e5VfMnMSauB0rsGQllLnBz2cgIRjt3boJofBGEHjP5G2Y1PBzoO2NmS3f\/Lra76AiJE\/bdM+dCYa\/pPHPjhCDaA5JEsntWIG1NpN6h1OIH+wynfNlZgZNjJSGZqsHaPp5K3mEIbJQvRVOdGLB44VSnIr1jVy4uHbXy\/uVQWdmBAotKXrBrq2OaaaUck7PniMgj1EW\/ys3ehHCbubQHT+q3VB8dW6iWqsNEr4ZC3ZS9qqyKBMt9UZTVo3QkZa\/KGMf+OhEVY+7T9xjecD1D6Blq\/4kJrYRFqtII1+9DV9ch9sbm7p2ieu6mxRb3krB13Z5QTijOZn9c9JlOk8C7JUDxKzpM5qG4ZdqGTvzHQpjIEn\/lkPRC5u9DzanroUIx4n0NV0T1ZcwnQ\/wSOzb18U0eNvfdfwl0wznnbFf7vvg7lHe51AlZLcwvDqVT6Zd0muV2KWNFKW7C87WwuSq3UHPbr2D0x+4sYmGkca\/iXg0yfQgEDoj8qkNKOTNY2207QeeMs4uD+lQ+1KAvq36+fyti67XIG4AY+3rvyoUhclLo3OahmcpU7cIKiqpIp0iCPjp11wKaRrA7U2r0Bv1C+J6BN44sfbPAVCoEgc1tG2zRhBAwegx2gLKT89z2pu+UEqvdnpBFplK8+iJpQSV7KzdmhiiMfhigC+PScBC0Bph0IorQqsEq2WDNDx+PFMldbDgAxP1bYhSjP0tBUtmDRRyU8McbdScNnGNSeRb7Pb5QRiqH6\/brJ\/vV\/CRmZXvrICjDSWwZmuVSE2YYpEma0cN6Z5sAePQY\/wNn\/XWgnK9nKvhsG1Xn2RzvHkJ9F9m\/ZEpE+Fd\/jSNV+prXR1qJdxk91uJ9DX6iXs8upHJTvbVSebNaLIymCl9Bzk0exVQkntFaJ85GICrRaDUrayt38J9OPDD2\/lHqDb+QA3ntrcFrQCicsxjTPCfvim3b3HtXRbfxJPd3Y7gXj7yr+J7OJ1oloHGUs72xTaJXUAJL3EZP0KhVruZ+vgceTn61zSk\/DRMrE5iIGb9jK51Rj3QQD5iS2QaE0g4NBsJux2AjFiX3wiv4lDRupRysrMmbEyKOWT35iNgUBFCmPaBofWCRQyxQfuKDpO1fw6hj+jwwamQPwhW4BmpUMUwFha+AChGpv9Y4qh7Q2q9oZl1xOId2N6J0Ym60HSljSyUwZlrFYCMGSzMNSMvBTGAI9\/4zHogZ5H21PDxerDimg6Y2g0Foxt0SmqAMLIXhj1hgo5tTlkwmABc2Gu1XfPti67nUBkPG\/l+1qQc5UMntmsVB6JGoGqysj0TvfSo2v\/wED6gS2O0tDQdqG+r3ZjeZ5\/X47daNmaD2L7lrplNMgC4RZvqpXO\/YF3VeTqfm35STw92vEEWg1oiUpYVGR7slnaaTBqJjHoKgGscL0A2J592eWq3XQjHm\/hn3nkStYHVhuDzINjnCRGBlP60dcVRhGBYR9s6QfVyrbSbiLudgIxWl+u\/1D8APffkJHVZhtZ3ZoYvAZ0xrsFfHhOgiwAQxGYfbVQyDS5+i086nV8rzalzeqifobAK0s4yqCVKP4K2DGwSSHj6K7irCwDcs7CricQX3ce50CdrSOrlabOfpLdaeuMF6ZGGogsApDwsuu8I\/i2SxfutXypzn36LTz+WjVMNLikcyjriLnikl3Ojk\/b4RuHM6X1xnFv+NZl1xPo3rqh\/Odv+OvOne2d2WNg+3xC2TpzeTbJcFYJLxTtP5G29yLSmZ+FRE79Ft6Y2\/nsUz1SDEXrhlee6OmzeVG44f5gWZXgv\/D4AyvlNuIu70hcD5VXFnKT9K+RJbMPAWkdaFeI6KuSFP812vozNAFcGtd\/4p+egPZCUsAmQ0SpYn23u15j\/VwaHzcqqe6gX0HOS9z1CsQg6VqQEjaZXSlM1rrI4Mx3So8Mb0RS3RiU8TebUdqj5yHMGlfvRBJv4ALS6kHc2C0KVSq4vBF89HmFxY+HislRqa8WbNpyv+8JVEnoa0HXlffkZJ9beFBLIyWVBS0ArDLRrwDStX\/j7QkeTWr5W+a76RTRZafVpDFYFMwg86CaXIoxMOAnoWOmrfiW36qLl1vfTFY92e\/beHW+svGf1X1BTkrn6sxqEGXpjG2BNpY76NG1f2Ag\/cAWR2loBNS\/wirO4LGJrwX5oks\/o++Vp2vUc5uxcR8B4a7Wlj+qoO7Ubt8rUD0BfiOZd2KdtGS7VgA9w1U2NwJglVSRDnEsBtMuuBTStYG6Ni4i3ncp34UXNAbMJbKCSMAmE7vosWblEc4G2SfW+KmUs8xb3wtEn3Y\/gXo16MQl7Z3N0YzKgmxZBXxQBiAJjj9i9AaVwrzYbHL7Tf0Sh69CY7KzQcQSj5ymn9hja4xw8TcPVB3MtPYzjzDgNy67fhfmz5\/IYpK8djWqSeg5rFJ8et8L67nhlYTDmrWEPnULgYKu+iM99Zm2MdZPbONMoKeDn8Db73a\/An2lLiZyEEcmk9l9VBlfGSXQQHBBVLNXiUDjP5G2D0rsPOL\/Af++Gyr5SZIdbjBgDQaEKM3Qd1+7BjM3RRruGDoukbb6dXpid9n1CsSTICO5M9F5XaNPZvezE6AbB9pWVh19VZLiv0ZbH5c2VM13st7KraxaGTj46Ymkwqg3Kx91eIX6bc+BFKf43t7w1+l5bl12vwLxNt5Z7cwmRUc2k8ocVFUWnMHBahQGINltfyOwmUK86xUAovrjX+nyYwpplq7jr3gUNESSp2323bEcx1g\/j\/RBFX62XcoPeVZr07L7FejLTz6ce3FI8zrXUYr2mGoJUKPXJZur1avCmRWo\/Yc5K0rj5zlM0eoHGIy0H0c3kRL67Ao0+IsQzsmXiOjpcWwSaEapWjZA25fdr0BcC+F3kis368EC4Oz20JYmGTsE2lU6k9d6dO0fGEg\/sMVRmgC4oGc1cSUJD1h8Ldgk\/oEqgFcZx0UveNcidKDBTTPcwLYuu1+BRrb2SHYGq02qDoOFtIe6AUPBypC7C9uVuuyCNK7q9ffSW70K6BVGvrFSeSkpLq80Y0UyO+gRxzb7nl2BLm\/8y2TqaO12P4GUn2RkntEtspqD0Ec0Pxz0afw+ECEfvXJJkdfxpaj4WjWY0Ah0SCAjtR8Ym0aXawrhomciZdo1sUWFXUG23+1+Anl8WTU4GquJ02OrmfRpXQeaB9KrBYfVKwvLCH1TS51Uw\/1EZGKBoU67KhRp21b7VotLcUr1av0noGMouz8H4pB9vu6L0bkLOVsp2ucVGmCncokg2VJGkzyvBn\/awtE4WdG1n\/FuX1hufuQD7LhgbB98Ldg0+iZUkbjfxE4A+nCAtb7jqQ4U2Nbld2MFqlF03tbIJoPHwPr4CjF0B0IAVUnqFWCFsT6KwLMwDFSre8XAUFTuVxupUVLZUs2sOCtCIWqn1SZ6uxVWHKLY9Kft3IPfkXMgPtLgQZnnQIx06W47B+KAFToHLvkuHAyyiQjZgvSsFqL0AW+\/PpF2dMePm1et8ln\/RmL7CV82rSjU5QQ9hRdc9HpOUs42enpwDJ\/E09fdv4RlfOcn8kwMp2s9vbICUGXBGQzG+hVAOq0IcLSjJHNKiy2bfYsHKukkSIZMOgUnGDa22rWt68QQAN2AScIzbuYUpbTb73Y\/gZTJZCsrRI2nz0WkpaU\/GWx1WzibB0Ac1YInXIUQCGYyX6yyuT3IQMlv4gHbJ4JNVg58x1IEELI7jjlr32p6IU5xS7v97nfnHCiZq+we40q2dyPCYVXGswqy\/ONdB3r93flOaIRpPphLKT0CxQ2LY6XJijP83KbJChancNE3q0Qlpm13u59AfVtnrxrzHCgDe9s5kA\/Jnc6B5JFrLf6YAk0OlVYet63xysDvNFO8L3TauElkoiBU7apk\/4naGPv3pPg450B97qXgG+52P4F0fGvk+3xDGboeUCk+retAM5BXC6bRagXpVmaGupIOqr+j38OLJ+KnFBsWCm72QXBbho13uz8HUuqT0ZXKPkfgPIEDmYKsJru1vpv2wyQoPGztX5IerZANjAGfzY+dy0c64wdfC8Cxx9F4eMBjCmG3q4nNTnYTc1ShKfu25XdjBaox9AokITmbgXUCY4jibBU9WY2pV4AVzPooAm+6X+eKcKvXcbRqAGwjNUpVvdKkXoEa5lWt8dDUQ0YIRLP5bv8TaCSuc3ieAzHCpLFHen4WxmEobCZKZzg4qGTjsJSbPaNnZRClD\/jwM6jXjzucAxWPiIunarPFu3y1klATM+XjnAMdOLTjBvX+JxAHsLZegZy1PZIYLPdh9wKQTJZpAARt\/2hFjpyFYxVnWfg6Txf5aYYkUjnJT50zyquHmdf9bZwsmdhg3ZfGuy2dHTr0pvXv2DkQGV0rhdKaca28JrWV3hEkg7tdj679AxOItU22aiF0m+aHmVnyQ2ErVXwi2GQlqMETPhyEoR1fgkav+PhIGGo8Ni27X4E+zIeZndEsFc5ZxpU07vGNcFgZE6iRrE4f7zrQjfphzS53kg7CjxhG3t7fZnD\/f9MKxPPTc2p4d2CjevcTKHmbjK6xJUtrMLMwVAJ7pOc5kMf\/TudAOga\/5XWgPm7dj\/V1IDqyjnOh+sLklB5H5oIw6VOp4Dl7DnTQBlCOfRcArS3L7ieQpkftPvvg5RpWDtCZ4ZSCQ2BD27vmYDQHtc87fEDNZHvje+Vw+9Zy40N\/rcd+HN0zfLA7tPsWoskT\/vhNffdlxpcNf\/2F9MzTPe\/m7ieQErJ2Ojdg9KTowafditR9NEczK1beha0IgrSdlUzHnhWOY+cdEVU6PisM1Lear9qsMnJWzNoVkfDFo+5RAyGi+P2OTUzEKj042tTgwB9D2f0EYnw5D9LgM6x1cDTmPbqjMYS2pI6+KknxX6OtP4QfBomvINOTCWff6NwwqvvZ9SB0\/+2Lw\/TVKhfSY3kJ2\/27MDLx56tvZSiDldYcp7ICUGVBptrRchkAZXf7G2GU9vLxCmBO2\/q+nLBUrJIcpKrEUTtqdQYebMYa5Xa0phHCVkPDTbAjKbufQE5qr0DKVzKaLFWpWkoqCzIJUwDBBkCvMn2e0Xh7mhPdsJtIPzJOKJqmMwaFsGiFTSXgoa1aZx7hg0OP2Z6BluUHr7ytZ7nlbvcvYUrGzmZGMtnuSUTG6rDWEUja0q4\/YLKs9EYEp4MnQpLfPLgSC0fvsKgk7LDf6RzIMWHjHKZq8ZkqUc2FvRSNEb7bAt6qNw35h8MOv9l+9xPIk0DHwoM4DjxNjlCPbYTDyphAjayc58S33bouhXRt6Dr20WSF+Q3FltrzpwoNawzlsLbO+pjLByc2aY5it\/sJxL\/ZfvbR+m56hvM8rwPd+Oij\/+f3wtylPtqsJ0wSLSWSWRWx0nfVmEpAO3QlCSU37YT+oGIfQ9n9BPrxr95RZio7a3xJ0IMihQ8d+rZ3zaGTS+2o\/dJn2Ty2Nx67cYA5uBzq9kM+wwcaByzD0Xipmw8\/QSe\/Y634BBBouZGflTHzdvvdn0QzdHpHw7kJD2pOILr4ZAJUthhG036YBY3\/ZLB9UGJXHPN8VAf+5bf5H\/allZPtg68FoismgZAb5zot9XHA7AB8+IikAeg3LrtfgfgorDNVo5yMHuOqNKc1hGGyED08gmUFWKGsjyJwwFyFfvR+f7W51QdxplLOLCCyV90rGW3DZh2UsW0HtFqBJAPcuOx+BSJJn6i7AkcGk9nKXEa2jMpWKgtOarc89gMwVoixOsjHFBj1CFzt0n2QjzJaLRIHKUe0XcpbzdqVsI4Br3qIfh2TlnQymw8SwS8s33\/5nSbfrN79BPrxr646MZOpymyneg0qqd6VBZlq55pxH4AkODZWg+glTV3zd\/3QfRfrJey99AG68gv54BntaV\/bOlbrFDk769xN5A70SFa+smxadv0S5ls5LixP1Y1dnblJ8xpnjgDZSl1ldb2HuUEiy7LSk9hOb\/A+rLSlh4c\/VgQca0elMDTtLHs1ZdBKKJ9uQ7GKEluoZcGqd2ElgMV2p3dh4N67+WHtty27X4F++CtfjdXBZCw58H1UdcTRyWBBclSoZSzlJNCkCEyIhknXhuC\/VP89mpJmCSWt48vqnV1jp5JX17T8aD7XQeEsXjnK8\/0bpwnkkb2LvbK8\/J25CJW1Wg6iGZUF2cCMmANgErK+VEZMVPNO6o6zLFev3zyIL4KpkdSMCuIAidEW8zlu66qmr+niENS\/8QQ2FXb9EjbegSmpa1cDO5K\/h1WKT+k6UMW4mbsSWSBUugNeKLSmaLkooxcQI+e5TVYYkPJx26soOuvFIYCJYfmH1991zA33+34JqwnD8Xvq4XoXRqbyUMaSsimkr5rs1vpu2g+ToPGfyOadfI5jf2K\/fu0DMcsHEpGFr4nRylS7ESNyvBPJLbAl+WHKdBC1roD37bwgtyr7nkA1aj\/L\/44nb8lK0nieA9HONgVQqxJAVSR4+yN2kdyKdV0yTT5OoWhvErXP7gYKjP7QzM3PgfYs83mVrrnlcmvc0D\/R5y\/tegJ9VK9hfA5GRs5MLUmpzmDKMOxCkdmsAGOspTCmbbJHb5b4wB0FmNp4CRu\/1AongAlCk1gdM3YqWQah+BolR3wVJyTNKxd225ddnwP9iHdgSWCvP3Wuk9XAQ1vGJLTtSeJSTtgAmCqGaIvGno3XOQnadqv68QcuK5xUbQhG3iusOlTt5ml+1ejVC2oK\/WSTWM0Iwb1YN9JtXXa9AjGcj+e+GDLXiVm1MpWhLY2UkbuN5Q56dM749TpgZtlEM9vQ3ahV0BcT6\/Ow2E0eLsWUJWoFcRx5mI+OKrZZxt46OrzqtCguHHyxkdBblN2uQJx3\/O2r18aYMZlUyNiWkUYjwmFVyLMKMl6X7gaLeYNsvlHfWi7n3w5IpVWiXRvktlu1R1DDmu6DV6XWxaeaQ7NagdDePIJbOna8Al1Yfli3cnAVmuxUgjLmtVR4BYpmVBZkA+Pjg4O3VLS92gyFkeHFZpfEKQX\/u56PMzDZeYDk61bHbD+BZZePXMGIhZZs6ksHrVp2EU6kSbbZ73gC9fmBU7Sz1+cM5Gw2slZ\/bmPnXKKTGSMP\/ckUXhTZhJBPbCsZoifqZZSLiSoQs5XvQZ\/UBrHigD9cQ4\/OqAOsOMHKB7dby2cq7tb3Re92AnER8ad1IU0rUA11nz+oVsZyGKoohSXQQHBRFiPOrBaULGcLrO3YVGQDUy1tNrxV\/\/qy7TaWOdjZBlF49Cubo610Rmk\/+jJi4W\/uY7grcbfnQLz+P1MX8booMxlZZWlrq3ZCr4WVETGAqiTFf7g1ohW31beWx+rfHTg+4AasuBGr2FJ7BDWsGRbFbp1cvPBYLFgc47v+bn5Dzrve7Qr0t69eVRZrwJSUzuPObg+ks1UZy642rxzBtrMB09arg3yU8KQ83sFAhQy\/t9fqarTpopMvMe1vb7fs1xYAwcEpv2kzPXbzyq6mfba+J2i3KxAXEXU+w1hXRvYKNHTobYjkzPYCga\/UxiCKo6oYhjnMjceOrdsIH9RtFX0taBqa2rGmT2JPAsVmh8rs6ZB0K3wBZB+4W5vf0rHfFejX13QnIkNN6dzVOUMy2lkrY3ZkMeiqlMWSaPmPilWADZOKmcFLJxuYMmoz\/sm6K5J7o2WQEXtAabsqHULbTCIyx8Wni7kn1H3BBeyj9\/sCZqO3qHc5gbgG9IOX316efGj1C2E1emQ5adyriDRKfRmMEChY1PJSSkfpjA9MiIZJ1wZqbY7HtSDeynsZWYMOKOzkpSYE2I336ta+6E0Xs2C9Aul5ln3re4J2OYE0spWF\/Q5MGVlK5W5lJtnpFqlqkdylIRuYarkMQBNocWh8o1BqhQi8213zkkqZ\/A3sLsCYB\/3D3L1Qf+0LYm2TidjRd+24y\/L3tRJvWXY5gfhlin947dpcaerYdfaqJsPHyoKRP+u0OmmVCkSWYKiygjXenl5lhq0xxIn8wrOPLi\/VZ1NEkQ4JG4871Njg1ha5cVLHto7ZfJjQP3Lfpc1\/aGqXJ9F8mfDZ\/KdkjX0dBq86CLVVYYBVkt3jnmgfnYFDj8v4LvskCNJ23QMNJauBaqYGxfZrH9xcXq1\/P26u2hM\/WN12XW260r9QJlcTSBRT2X1\/dBuKGx2RqmbXsR21NNIPinMXdjmBGF4+RO05wqj5cNZolrKHX6M5GkOQeu6ir0pS\/Ndo6+PRhlE7Hn3pHx2fHWuQfd2qPYIa1qRRFVytW8Vr1dpOwJpQW38iv7uXMMbtf\/7NL3X+s151yEgnadUjLUuDUpUFmWpHy2UAnM3YZI++QMJGV1U4E6fxpefepPFOrAM3vNp2bT+ii7mqWQulZuuAoa1213KlzU8Nz4upqM+77G8CMULKPqqkZlWdu33O4IGUAWMyu1C41M61yFD4j0q2wSabWuh5tD21udD7\/mi9E4NWnApmP+3RmkMOJR\/gEkNq7xRPMWiv7HruxMzJu0JusNvdBGLAfvIan4FxH\/QcseRo6UoaBmepEx1w2khpShc9uvbH7GJm2VCUoEf709a2LE\/WnQE365uq9hUZDnrIlR0tkQ0C6VoPel2MxQosXKJmZ+SWH6jubgL9uO5CfI7bWJ2QY6yTy85SlgMVQCWoGUFyVI0R2cThHpgQDZOuDdTaelVadFvHS2\/VxcR2CMvaBadePWaUINTvRh\/StJYVzPRV19\/W31Dd3QRi+B6vn\/Ql+0jkLohqajW4o6ER7ZI6npNAvCsG41qxruXjFUV9qfYb7+YzMXkZvHahl72qpMeFDKJJ0rNBUebJscKWyB2RW5ZdTSDG6i+\/95KuQGuVWI0dmalmGZThPaoobWihLakDqMoLgP3lskKYY0URN52XKKZt4+KmfM3SXN36p1yBiL\/lB6q7mkAcE\/JPW+2UyVHm7ADl1IOMA3YaTnK3cF0Bpg2OdgxCvMMfJVzqhGrzLnWT1+Xlr3\/xhm3i6Ajm1F5+HTtcao7OorS3VO1rLSriA3j0yuVNP1Dd1XWg79evkr5X3wd\/sk6gtVr0slCp7fXn\/L+VoRWojqf7wzc0LtXLWN1cxnIjpXumJioe3TBIWKH6eWAXUpV47Ke9\/JGYVtRbfh62uxVImcfQkYBKRQZ7ZiarwliZSFEwwkWQHN8zenPaP7DBLJsCcdjAhDfxuv1wfUL+w\/qg122D7JFuyLf0ChCSdoYLQ2wTYr2eW+xe\/dShTT8P280E4hP4b3\/3xeUrTz9So6ZUHVnPMM6krpzs5SA4GRuh7DYev+E5CZLhto69Q07Hxlcs4imkdLfmh7wO3JFH67ZzoO5vk8BT6FQlIrsdrXQAHrl\/2xeR3UygPpA+SXWWjpUmSeuMrWztjO5slh1rbMr0ZrReWW8CrR5aCaQMDh9toimqFdcZ\/eF5kBcU+Maj8KZGA1\/V6oZ2igPAttjTNod1AOhT\/88yqM67bDt9f4tn+\/16WdBrPVlaA+ekVY6SrFoFpn5FLKDPFdDab9Y4iwUO2dWyTjTJfKsVxzgZRbRus7o8VudBb\/Z5UPiFgZ\/HykHs1e5VadjjV1Vi4CdrVPMcaMvPw3a1At1kMJOWSmLJPpBaHcroVeLAMHwixGHFBSl\/2sJhlEDK+qYs0Gijo63NfMgP37c6DzIaem3swShYa2kjw6O6mpaktipxojcHLtt+Q3UXKxDz5n\/U+c\/X654bF7Ix4tSUVAdBWbqyDdwQVkbE6KuSFP812vq4tWHUrAoKa0A6xkctXWQHI0X6roY148nIt3SxDYhUiVNG69l7Zd3yG6q7WIG4248fU3q67gHqlHQSk7lWJXdJSWXlyiAXZTbZq2R3a2CYePy1DQ4U2rKPzhhMcNmJeq2nwZf+uB50DzYxUecBGKXazeVaugNb7MGaIVhoiuuR+lrRVp+H7WIFYnC4gazPExh8J7pyURnrvNz+OpD6WMf3wcsXF24yo19+eGGRTLe9jKQqrXQ29HMLRE92ciChmudAJinlBmUXKxAThq8Pk338dZaSyF06M70atCH4+Mg5Jvme0WthqJ04mlhR0XVoRxr+jYcLjIAX9Hkd14O8AsVHEPOP50EcOFKbRI2GxG6MmTqOaz4P2+rjjKOfQGTjt7\/7kq6tOPcY3FLyRyqmIKpZyl4FGheDEfGZrvFMhQ+80z4DSNcGam2Op76k3QR\/8JzP2QxlL3b3T808I\/oso5FpdFVO2IPpOp3kufKJ\/FY\/+Xv0E+j7r7y1vF\/\/WORpfgt6pr0TVe0a+awOncVncbZj7exPxnPQlOcHBFltjBdEMPvOLqy4WEEajqBtWa5Xv8d5UABE9irl2LiBt9m+2P3AFrs0AkvVMYQVCbbzL0c\/gUg0\/ieFMlBZ5yy1qLzVSkAmNsYrUGdz1fpzWzawMWdNCEdVsplLSrNOfdtTa3WQXAePOCWjQ\/7iEw\/qnmWOr3hXXNgB8TCHQJGtD8S6YEfPEgNevp3xN7\/c5r8XHvVJtD6+qNs3vvH8YyP\/+PYEacn\/YKcwjhSvOghq6oBJUmqX1L9IzwGjdNb+E30rowKImZVDffLXK5Zn8u2RDqfA1fDEAe2u6f\/L09fqnp6b+kXDnYUO0ZtAGKotgOQtdke9Av3glXf06ftT9bXhVU7WOFWrxrAnDwNnOwK2MnZBVHMIbUkdfVVyi79cVghzNFdquTqefdFPPtyv190D\/TJGW\/0EowC0UM5aiANb24MRg3U4e8WrX6t9Y5vfjD7qCcTY6qbxPifQauIcRFyvOmSichGscHgD6sqCKdZ5OwDlB9b+RqAwhfTECLxxXa\/1AhUO3Rc+45exdA6G0mM0s6vmRW+7cB0cnR6HPnA01\/OPXcF47uVoX8JIwr\/4zovLHzz32CpDS4mhBk6J7vyVzvl5PNeBtDpwOKu\/z9QbAN7O31z6XC7Po4w8Ha1ACFqZSlcyFtti73ZqVh4mFShqzhO3KEe7AnHx8P362RTefSkrNUykHMNUQ6bsm0PWGUpG3mkFsmP7i3JwSQhf+yuM6M2seAo92+pL4mGn7RUBwW3q63VweRm79572jb2MwPT8hNdOzw0C22LvdmrH6Xh1I1vdmbjF1eijnUB8fOEbxpWOyrTkZI1odEpRjoA0aJXF8xzIuBiMis90RTrEeQWAbFUCMVfp4+bVo3q2amcJGZjPP\/6Av0EqDrCAKXlG1ba\/SWxuG7Do5WPajtHnQP2P7wI5t+ooJxDj9e3v\/XL55vOPKztJReVup7kVc6WRHUyVrAhuTYPzufZwgBlDjDRxyIIIMVHNi82mFRd8K30IonMsXsYOViDi46eq\/aslLvStQ2Vy9ji4ttArEcotrkYf5QT6QX33690Pbiy8+3KmkY1kac2szkaJZGaVyI1xhmOTwRXyiiM01glX1uYpgYccJTk2vGc3nKzrcKuYojDT1fpcrF\/G1L+VbfrbV23iCkO\/4DCP4hEKo+Cur1za5nT26CYQA8PJ8wvP1rUfp5qzkowkzaLDZnuNZhUyUQ\/qQ8PwiRAHnOQpP2TcxCMuwwCZN23ZiBF\/2trcdmyIGu\/6S599aPnOL95UQxjZYa4y\/GmZG0sgtnc7dXN0Dc0WH2cc3wSqAfr7+gFN7qdRBjrNkoGkJMXZafvQgCQ1nZ1WK0tjwNjaVY2uNv4k2h+xi+RWrGvkxLOv280n\/4G\/tXy17uf+3ktvrvq3WlXChS9cWOS61qdD1gtkrhIfrXujf1jXzc67HN0E4l9YPqWrt85EpToZyqNqp7ZtbltlBHLjGMrCxwU7DVO4BWIFmLbEsy376OyPW+KkXutFROgR2\/hnH72iVejivRl2fGWa\/WpeLPh7MxF7HFxbGCtQAbf4\/2FHNYHIrP\/+179YvlHXfvS6j0Lp6Hz0676UUSODmRlrv+htGHah5O4sX6W4MfD0iiKjwCWBn30YmO6bfNKP6HBHVK0+2v8rTz+8\/E2tQugBuILfbemktw498XBgv\/ZBIVvqLa5GH9UE0rWfuvTvz4+SlUo55SM52ek3spMxpRhRNVlN2qoErya7tJHSlC56dO2P2SWx2xV+Hu1PW1uh4y\/jsDsCOh7PPHKl\/klefeyAXRqq5hNB3EELUm2TuW29dIKzg+LCssXV6KOZQCQZq8\/X6uSZTFPmMYBKM\/Z+SNU6gCnyQS5HZ6wacgc+hPhM13imUqSSpx3fKq1rA7U2x8siUTqAbG23qH6F9bl6KftxXSilAJNNePvZXRashZFRcijkg9wrEBxbXI0+mgnEW\/f3b9S\/L+D8p4aKpKNugbzrTJQlWadRDbbxZ3HKULOag4yXowIQxMFMkJA0JgolvPTLVOnPHfQhCDaxwIWPf8zyQd0rBJfoxAGvFY4TWeGQQaqRemK7P888fOXcr0YfzQT6y3rr\/sRDl5VRTmIyu8bKDWWhs83Z2BiNZjKRTAXjFcg4+88sbg5z4y0vqoQKB4psQoS3+bvGybLhzd98sitM4pT8xSce0Nef+We9iiIO\/N2J5k5T\/Ic8QMEe1u9cv3HuFxOPYgJx7vOjX11dvlVXnmeWk+GMvLPP+eusQ6dklR0MCRoEtR3bIArv1g44yRM2yea0\/0Q2r+kIrAcAbcGn7djVoE0Ztf2kKo4v1CT6af3DYJnhRGAXeaClknFiBcUA\/LCG\/zzLUUygP+ed1\/O5f9iJpWwkyZJmlWwzg9F1dvZgDWsZlJ3TIArvRNiW1OgcVPHiv0ZKbsW6Rm68ZLebTwEGfvSQaLpb8VJ9uPq39dJtjviKD4Z2bDntVtNZ\/lLDwdXo876YuPkEYvXh19a\/9bn63KtKEkqZhWyF83Fkd6WecAKA4Y+H8XMFcna2XahwCgteXsZ1PPzNZpT20RmzioNeW1PBteZzBHTmTLvg\/CzwD19+Z+VvX\/OFQ7ThLFndVd0xXIu\/xL+ri7DnWTadQCTTf\/urXyzfrG8vkEgUvf53jU4Z5ux1tkkZdTuRjM5Z+TeZUhQO27UPpyByl8IYcGVwH6IPc+uGPTg6Yl3iQKzNVXdBOBrAsKteli\/VDWesQlLFd8YIVfR20t4cCsXOnNwbzY3851k2nUD8z9P\/k9WHpKU4+1NLR4Y5e5XB0SnJ4yO\/XjPANhnpCiY+EuIjyBm9Oe0fmJwVvRSGq0WXwh182ootorYf+pV29A8Yv+z6I61CMmCUfcQsjJ8PAcCkSgzHC6Zs530xcdMJ9Oe1+vS5j4clGVcNJZ2UybCsBMZ11rWXktD5XY6d4dIWNAYLtC1ZkNF8jZuxA4mDXOPfbnR0vQK54yu+iMI5QPZ+jnSOVejvKpm6v+IDNWhKaC9ESjqp5yqzwc\/XNabzLNvcA1DPkHMfXq+\/9blHl++8mE+pzz5zsq3GhWRjjJJ8Z1EHbcZV+HagXpXRDHBONoNQUxq3tktXO9tq4gTodullizVKT4b4xL6O0fZXr11fXq9feOXOQlz5Rgq\/+Eot3lLWObfb9C\/8dGFdDn8ldm35dOTNJhBP5z9947kaiLqnlyP+MYoOZmHPolvfFNilk6JacZg6I2HycTh7NM7eWx3m4jFHCKM+y0tA6YBBvYJPrJWY0b353o3ltZown6\/fwLZuWT5XF1Uv1qxhsjCRyIzL9UHs5FiWP\/p83TO+YamvI9GzUzmNwCcbgU3PgT5Zl09exzQCpwl0TEdjh305TaAdHrRj6vJpAh3T0dhhX04TaIcH7Zi6fJpAx3Q0dtiX0wTa4UE7pi6fJtAxHY0d9uU0gXZ40I6py6cJdExHY4d9OU2gHR60Y+ryaQId09HYYV9OE2iHB+2YunyaQMd0NHbYl9ME2uFBO6YunybQMR2NHfblNIF2eNCOqcunCXRMR2OHfTlNoB0etGPq8mkCHdPR2GFfThNohwftmLr8fwEoIP+XGUTiDAAAAABJRU5ErkJggg==\" alt=\"Lentilles achromatiques n\u00e9gatives \" width=\"107\" height=\"159\" \/>Les lentilles achromatiques n\u00e9gatives sont des lentilles optiques sp\u00e9cialement con\u00e7ues pour corriger les aberrations chromatiques, g\u00e9n\u00e9ralement r\u00e9alis\u00e9es en liant deux types diff\u00e9rents de mat\u00e9riaux en verre : un verre couronne \u00e0 faible indice de r\u00e9fraction et un verre silex \u00e0 indice de r\u00e9fraction \u00e9lev\u00e9. Contrairement \u00e0 leurs homologues, les lentilles achromatiques positives, les lentilles achromatiques n\u00e9gatives fonctionnent principalement pour disperser et non focaliser les rayons lumineux.<\/p><p id=\"structure-and-working-principle\"><strong>Structure et principe de fonctionnement<\/strong><\/p><p>La lentille achromatique n\u00e9gative se compose d\u2019une lentille en verre couronne \u00e0 dispersion positive associ\u00e9e \u00e0 une lentille en verre silex \u00e0 dispersion n\u00e9gative. La conception vise \u00e0 contrecarrer l\u2019aberration chromatique produite par un objectif par celle produite par un autre, corrigeant ainsi efficacement l\u2019aberration chromatique. Ces lentilles jouent un r\u00f4le crucial dans divers syst\u00e8mes optiques n\u00e9cessitant la divergence de la lumi\u00e8re.<\/p><p id=\"application-fields\"><strong>Champs d&#039;application<\/strong><\/p><p>Les lentilles achromatiques n\u00e9gatives ont une large gamme d&#039;applications en optique, telles que les expanseurs de faisceau laser, les syst\u00e8mes de relais optiques, etc. Ils offrent un angle de divergence stable sur une large longueur d&#039;onde et peuvent produire un point et une image plus petits et plus clairs par rapport aux objectifs simples.<\/p><p id=\"advantages\"><strong>Avantages<\/strong><\/p><ol><li><strong>Correction efficace de l&#039;aberration chromatique<\/strong>: L&#039;objectif peut disperser des rayons lumineux de diff\u00e9rentes longueurs d&#039;onde sur le m\u00eame plan, r\u00e9duisant consid\u00e9rablement les probl\u00e8mes d&#039;aberration chromatique.<\/li><li><strong>Qualit\u00e9 d&#039;imagerie sup\u00e9rieure<\/strong>: Par rapport aux lentilles simples, les lentilles achromatiques n\u00e9gatives offrent une qualit\u00e9 d&#039;image plus claire et produisent des points lumineux plus petits.<\/li><li><strong>Diverses configurations<\/strong>: En fonction des diff\u00e9rentes exigences d&#039;utilisation, les lentilles peuvent \u00eatre configur\u00e9es avec diverses options de rev\u00eatement adapt\u00e9es \u00e0 la lumi\u00e8re visible, au proche infrarouge (NIR), \u00e0 l&#039;infrarouge \u00e0 ondes courtes (SWIR) et \u00e0 d&#039;autres longueurs d&#039;onde.<\/li><\/ol><div>\u00a0<\/div><p id=\"manufacturing-materials\"><strong>Mat\u00e9riaux de fabrication<\/strong><\/p><p>En production, les lentilles achromatiques n\u00e9gatives utilisent g\u00e9n\u00e9ralement des mat\u00e9riaux comme le N-BK7 et le SF5. La fabrication des lentilles implique une conception m\u00e9ticuleuse de nombreux param\u00e8tres, tels que le rayon de courbure, l&#039;\u00e9paisseur centrale et l&#039;\u00e9paisseur des bords, pour garantir des performances optiques optimales.<\/p><p id=\"typical-specifications\"><strong>Sp\u00e9cifications typiques<\/strong><\/p><ul><li>Diam\u00e8tre : 50,80 mm<\/li><li>Distance focale effective : -150,00 mm<\/li><li>Rev\u00eatement : rev\u00eatement \u00e0 r\u00e9flectivit\u00e9 am\u00e9lior\u00e9e pour la bande 400-700 nm<\/li><li>Mat\u00e9riaux\u00a0: G\u00e9n\u00e9ralement du verre N-BK7 et SF5<\/li><li>Distance focale arri\u00e8re\u00a0: -140,40\u00a0mm<\/li><li>Rayon de courbure : R1 -83,20 mm, R2 72,10 mm, R3 247,70 mm<\/li><li>\u00c9paisseur centrale\u00a0: 15,00\u00a0mm<\/li><li>Qualit\u00e9 de surface\u00a0: varie de 40-20 \u00e0 60-40<\/li><\/ul><div>\u00a0<\/div><p>Dans l\u2019ensemble, les lentilles achromatiques n\u00e9gatives jouent un r\u00f4le essentiel dans les syst\u00e8mes optiques qui n\u00e9cessitent une d\u00e9viation de la lumi\u00e8re et une correction des aberrations chromatiques de haute pr\u00e9cision.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-23ab886 e-flex e-con-boxed e-con e-parent\" data-id=\"23ab886\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-57bee19 elementor-widget elementor-widget-heading\" data-id=\"57bee19\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Lentilles triples achromatiques<\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-7cef211 elementor-widget elementor-widget-text-editor\" data-id=\"7cef211\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p><img loading=\"lazy\" decoding=\"async\" class=\"alignleft\" style=\"text-align: var(--text-align); font-size: 1rem;\" src=\"data:image\/png;base64,iVBORw0KGgoAAAANSUhEUgAAAJYAAADCCAYAAACrHjsDAAAMPmlDQ1BJQ0MgUHJvZmlsZQAASImVVwdYU8kWnluSkEBoAQSkhN4EESkBpITQQu9NVEISIJQYA0HFji4quHaxgA1dFVGw0iwoYmdR7H2xoKCsiwW78iYFdN1Xvne+b+797z9n\/nPm3LllAFA7wRGJclF1APKEBeKYID96UnIKndQDEEACVGAA3DncfBEzKioMQBs6\/93e3YDe0K7aS7X+2f9fTYPHz+cCgERBnM7L5+ZBfAgAvJIrEhcAQJTyZlMLRFIMG9ASwwQhXiTFmXJcKcXpcrxP5hMXw4K4DQAlFQ5HnAmA6mXI0wu5mVBDtR9iRyFPIARAjQ6xd17eZB7EaRBbQx8RxFJ9RvoPOpl\/00wf1uRwMoexfC4yU\/IX5ItyOdP\/z3L8b8vLlQzFsIRNJUscHCOdM6zbrZzJoVKsAnGfMD0iEmJNiD8IeDJ\/iFFKliQ4Xu6PGnDzWbBmQAdiRx7HPxRiA4gDhbkRYQo+PUMQyIYYrhB0mqCAHQexLsSL+PkBsQqfLeLJMYpYaH2GmMVU8Oc4YllcaawHkpx4pkL\/dRafrdDHVIuy4hIhpkBsXihIiIBYFWKH\/JzYUIXPuKIsVsSQj1gSI83fHOIYvjDIT66PFWaIA2MU\/qV5+UPzxbZkCdgRCnygICsuWF4frI3LkeUP54Jd5guZ8UM6\/PyksKG58Pj+AfK5Yz18YXysQueDqMAvRj4Wp4hyoxT+uCk\/N0jKm0LsnF8YqxiLJxTABSnXxzNEBVFx8jzxomxOSJQ8H3w5CAMs4A\/oQAJbOpgMsoGgo6+hD17JewIBB4hBJuADewUzNCJR1iOEx1hQBP6EiA\/yh8f5yXr5oBDyX4dZ+dEeZMh6C2UjcsBTiPNAKMiF1xLZKOFwtATwBDKCf0TnwMaF+ebCJu3\/9\/wQ+51hQiZMwUiGItLVhjyJAUR\/YjAxkGiD6+PeuCceBo++sDnhDNx9aB7f\/QlPCZ2ER4TrhC7C7UmCYvFPWYaDLqgfqKhF+o+1wC2hpgvuh3tBdaiM6+D6wB53hnGYuA+M7AJZliJvaVXoP2n\/bQY\/3A2FH9mRjJJHkH3J1j+PVLVVdRlWkdb6x\/rIc00frjdruOfn+Kwfqs+D59CfPbFF2EHsLHYSO48dxRoAHWvBGrF27JgUD6+uJ7LVNRQtRpZPDtQR\/CPe0J2VVjLfscax1\/GLvK+AP036jgasyaLpYkFmVgGdCb8IfDpbyHUYRXdydHIGQPp9kb++3kTLvhuITvt3bv4fAHi1DA4OHvnOhbQAsN8NPv5N3zlrBvx0KANwrokrERfKOVx6IMC3hBp80vSAETAD1nA+TsAVeAJfEABCQCSIA8lgIsw+C65zMZgKZoJ5oASUgeVgDdgANoNtYBfYCw6ABnAUnARnwEVwGVwHd+Hq6QYvQD94Bz4jCEJCqAgN0UOMEQvEDnFCGIg3EoCEITFIMpKGZCJCRILMROYjZchKZAOyFalG9iNNyEnkPNKJ3EYeIr3Ia+QTiqEqqBZqiFqio1EGykRD0Th0ApqJTkGL0AXoUnQdWoXuQevRk+hF9Drahb5ABzCAKWM6mAlmjzEwFhaJpWAZmBibjZVi5VgVVos1w\/t8FevC+rCPOBGn4XTcHq7gYDwe5+JT8Nn4EnwDvguvx9vwq\/hDvB\/\/RqASDAh2BA8Cm5BEyCRMJZQQygk7CIcJp+Gz1E14RyQSdYhWRDf4LCYTs4kziEuIG4l1xBPETuJj4gCJRNIj2ZG8SJEkDqmAVEJaT9pDaiFdIXWTPigpKxkrOSkFKqUoCZWKlcqVdisdV7qi9EzpM1mdbEH2IEeSeeTp5GXk7eRm8iVyN\/kzRYNiRfGixFGyKfMo6yi1lNOUe5Q3ysrKpsruytHKAuW5yuuU9ymfU36o\/FFFU8VWhaWSqiJRWaqyU+WEym2VN1Qq1ZLqS02hFlCXUqupp6gPqB9UaaoOqmxVnuoc1QrVetUrqi\/VyGoWaky1iWpFauVqB9UuqfWpk9Ut1VnqHPXZ6hXqTeo31Qc0aBpjNCI18jSWaOzWOK\/Ro0nStNQM0ORpLtDcpnlK8zENo5nRWDQubT5tO+00rVuLqGWlxdbK1irT2qvVodWvrantrJ2gPU27QvuYdpcOpmOpw9bJ1Vmmc0Dnhs6nEYYjmCP4IxaPqB1xZcR73ZG6vrp83VLdOt3rup\/06HoBejl6K\/Qa9O7r4\/q2+tH6U\/U36Z\/W7xupNdJzJHdk6cgDI+8YoAa2BjEGMwy2GbQbDBgaGQYZigzXG54y7DPSMfI1yjZabXTcqNeYZuxtLDBebdxi\/JyuTWfSc+nr6G30fhMDk2ATiclWkw6Tz6ZWpvGmxaZ1pvfNKGYMswyz1WatZv3mxubh5jPNa8zvWJAtGBZZFmstzlq8t7SyTLRcaNlg2WOla8W2KrKqsbpnTbX2sZ5iXWV9zYZow7DJsdloc9kWtXWxzbKtsL1kh9q52gnsNtp1jiKMch8lHFU16qa9ij3TvtC+xv6hg45DmEOxQ4PDy9Hmo1NGrxh9dvQ3RxfHXMftjnfHaI4JGVM8pnnMaydbJ65ThdO1sdSxgWPnjG0c+8rZzpnvvMn5lgvNJdxloUury1dXN1exa61rr5u5W5pbpdtNhhYjirGEcc6d4O7nPsf9qPtHD1ePAo8DHn952nvmeO727BlnNY4\/bvu4x16mXhyvrV5d3nTvNO8t3l0+Jj4cnyqfR75mvjzfHb7PmDbMbOYe5ks\/Rz+x32G\/9ywP1izWCX\/MP8i\/1L8jQDMgPmBDwINA08DMwJrA\/iCXoBlBJ4IJwaHBK4Jvsg3ZXHY1uz\/ELWRWSFuoSmhs6IbQR2G2YeKw5nA0PCR8Vfi9CIsIYURDJIhkR66KvB9lFTUl6kg0MToquiL6acyYmJkxZ2NpsZNid8e+i\/OLWxZ3N946XhLfmqCWkJpQnfA+0T9xZWJX0uikWUkXk\/WTBcmNKaSUhJQdKQPjA8avGd+d6pJaknpjgtWEaRPOT9SfmDvx2CS1SZxJB9MIaYlpu9O+cCI5VZyBdHZ6ZXo\/l8Vdy33B8+Wt5vXyvfgr+c8yvDJWZvRkemWuyuzN8skqz+oTsAQbBK+yg7M3Z7\/PiczZmTOYm5hbl6eUl5bXJNQU5gjbJhtNnja5U2QnKhF1TfGYsmZKvzhUvCMfyZ+Q31igBX\/k2yXWkl8kDwu9CysKP0xNmHpwmsY04bT26bbTF09\/VhRY9NsMfAZ3RutMk5nzZj6cxZy1dTYyO3126xyzOQvmdM8NmrtrHmVezrzfix2LVxa\/nZ84v3mB4YK5Cx7\/EvRLTYlqibjk5kLPhZsX4YsEizoWj128fvG3Ul7phTLHsvKyL0u4Sy78OubXdb8OLs1Y2rHMddmm5cTlwuU3Vvis2LVSY2XRyserwlfVr6avLl39ds2kNefLncs3r6WslaztWhe2rnG9+frl679syNpwvcKvoq7SoHJx5fuNvI1XNvluqt1suLls86ctgi23tgZtra+yrCrfRtxWuO3p9oTtZ39j\/Fa9Q39H2Y6vO4U7u3bF7Gqrdquu3m2we1kNWiOp6d2TuufyXv+9jbX2tVvrdOrK9oF9kn3P96ftv3Eg9EDrQcbB2kMWhyoP0w6X1iP10+v7G7IauhqTGzubQppamz2bDx9xOLLzqMnRimPax5YdpxxfcHywpahl4IToRN\/JzJOPWye13j2VdOpaW3Rbx+nQ0+fOBJ45dZZ5tuWc17mj5z3ON11gXGi46Hqxvt2l\/fDvLr8f7nDtqL\/kdqnxsvvl5s5xncev+Fw5edX\/6plr7GsXr0dc77wRf+PWzdSbXbd4t3pu595+dafwzue7c+8R7pXeV79f\/sDgQdUfNn\/Udbl2HXvo\/7D9Ueyju4+5j188yX\/ypXvBU+rT8mfGz6p7nHqO9gb2Xn4+\/nn3C9GLz30lf2r8WfnS+uWhv3z\/au9P6u9+JX41+HrJG703O986v20diBp48C7v3ef3pR\/0Puz6yPh49lPip2efp34hfVn31eZr87fQb\/cG8wYHRRwxR\/YrgMGGZmQA8HonANRkAGhwf0YZL9\/\/yQyR71llCPwnLN8jyswVgFr4\/x7dB\/9ubgKwbzvcfkF9tVQAoqgAxLkDdOzY4Ta0V5PtK6VGhPuALcFf0\/PSwb8x+Z7zh7x\/PgOpqjP4+fwvAiV8bvXSQ1sAAABsZVhJZk1NACoAAAAIAAQBGgAFAAAAAQAAAD4BGwAFAAAAAQAAAEYBKAADAAAAAQACAACHaQAEAAAAAQAAAE4AAAAAAAAAkAAAAAEAAACQAAAAAQACoAIABAAAAAEAAACWoAMABAAAAAEAAADCAAAAALDyyC0AAAAJcEhZcwAAFiUAABYlAUlSJPAAAEAASURBVHgB7Z3bsmTHcZ57MOcZDDCDI0mQEkXqQpboUOjCt3oA+wn8FH44X\/jGEX4Bhx1hy6ZFWkGJJEDijDmfMf6\/\/8+sqt57ZgCS3b0R47327lWVmX\/+WVWrsnr16tXdZ55p25xupyOw4xF4bcd8p3SnI+AROJ1YpxNhLyNwOrH2MqynpKcT63QO7GUETifWXob1lPR0Yp3Ogb2MwOnE2suwnpKeTqzTObCXETidWHsZ1lPS04l1Ogf2MgKnE2svw3pKejqxTufAXkbg3F5Y\/wDSX356Z\/Off\/HJ5tmZzUb\/2s5snumPrd8e9\/vkZ2LNe+bUtzE4ty14GMQlEqOBLxisxLn\/+OvNlfNnN29fuYBqJ9vDJ083v7l5f\/Po6debH1y7vLl84ezmq\/uPNzcunxe\/2qO+\/O7Ww83337jotkmxOVPte\/r1s83Z12ixNtor+dO7jzbvXr0ATDqUm81ndx9url06X\/2TrrBP1N9zYPT48Y3Lm7\/\/6buby+e0flgFKPFV2+t2ohPryddfb\/7LP326+fS+Bu71Sxk4xo5RqC21KXuAZMu0YpwycRrf+iGXgoKD90y7J08zdeW6+eLmg82Hj59uzn7vDbuMyUmE\/CeWwBI5LsEdscdvs9E88Hb9ysXN\/\/79TU9cJtQDTbb7T59ueIpgYt1++Hhz7l56ikwPX9OEYmKdf+01j4XU1j\/QBL335Gv70Sj09No9B1MTkfKs+nb2LGybzX\/837\/T5L20+Zn65ghufDVQduLuazuRieWuaffLz+5u\/sdHNzf\/7l9\/wGHKVpUcxqw4GNreB5AxQoecMu5f15FfS2MLjx6Z8t6jJ15J\/u3ffH+Lf+Vb+aNnT9yj8Wc7qGH\/m++\/ufnnz+9ufnD9iifDa0wgHUvKH95IyaH1xCp95EyonnA\/vBE\/bGyt73nRsmeh4iLTujsPn27+SfF\/9r037Rc7XLKnG9HvYX8y51gadf5+pU7\/5O3X00c6qkcs3esusWGM7Kq9Fnt5Mkbr5DPM1Bzs5sDv2eYjPV3dWJ4Cw2uTdiDysLBI0c89KCR2rlHq8YM3L2vFerK5pdVpcEyg22MxjiXjXPBQet99mpalpmAdN9oQ\/PTd1zecagzC4qVtQxeHne9PZGI5w5Q1v9CK9c61nGeQRH540Sbj+lF9bgAWsIsdZDRVA4CGout42NFKnf8823z41f3N3\/1IS0fgxYsP3imqap7EbH14Yi+LBNcUh1A3Hzze\/CutFh\/fehBCiO2Q0uPQkVDht2JoQ+HddqxxnTzGT7\/GA7igc6vf6Kn+97cfJr65ijPAatfuixOZWH56Udp8dPPe5p3XLzq7oyOPOvtUJrWSwGSlH8Io40BRIfmQrXGl\/GJuo\/Hms8+zze+0Wr37+oXNJQ0+buEOn0njEX7HwOZApYvsvTndhMmDTo+3r17cfKKJ9VjnSfavWJA4ZrFJWHzdGzqFmv3AIsPzPF+ojM\/OmLevnN98dqcm1sIVINz72U5kYpF2v9Vq8bBOSJ087Px\/NPs6OcnWZGzj4HES1m5mdbhstA2O+MfnzOYjxf\/puzphb6i5j\/DZK\/FjCRl78\/V+aUe30aXs93Ue95fvXfOqZQ7iCc\/WGEfo+C6tCab2wVrAs\/5Khq84Ay9+od7UK8fP9eIoevbyNTaYGHa\/P5mJpYz65M4DdzoZqI5VxdlI6h3dZCdLvZGZxqy4eGJfcU1lq2Mk9vmzr23e19Mw9rDAX3UrwhebWWGm4n1bW1MusqnGv9tqSSvjxc3Ht3k6XG3B2G\/RD39Hsof9skKVEvy6VaypavuzzUVdSvniXp3jWa0IVU787msnM7GUMV89eKrrO+edaOSOM5LEG7lo7eyxfJJpSU5woNl6Hx320hiyWNHr8eGX9zYf6BqPLw1EZRabB+FsCSqiDP4hTY2jwEVrRNSrApxsTOTPdD0qZgONiXmVqw5QW\/zDF+6OYasxjmfiia9Am9cvndt83E+FpoRrEMd\/D\/uTmVhKmU+1Yl27dNaZTQI5I1UhY5O1CE6t5KfqA1O4mc+MTPlR4tfugyP6uw+ebG7qYuVfv891q23cWBWkbj5Xj0joEq32tC0u1cbEslUGyj9\/68rmt1\/cS8jRPiPMRl\/TPzvYx5RFnLZN25ALhEwjKGpnvtcvntt8wYQ2LrtgAe5vO5mJpZT5nU5ouXLslYr+kUb+Jy9TT2pZbbuxmApXlhqd8sO7uYSDis1W6XlK4oQ6FzJNlDCyzbYMj3a3f5OFNvGa12GgM0+Vw+vM5sqFc5t7uvRwXxdKZ\/vCYd6Or5Kg5nO7qy3YqXrr2C1KLr+Yg0R3Vc8KX\/z\/dI71pZ73ySYnGKNRleRwZ1OX2FV3Ola1HTySIcDXtQVXKhXYnvmC5c8+eHPIqAueEKEKT6EsAPQj+25nRYwFLmr829BRw\/BDXSjlRUMAYGLfluMfD1uM9yrTyqOleVY\/BydAfJVFn\/J0uKpbOMq1I\/lEVqwn6uCXejoii8ktP7RL0i1ZvORojJ2J+LRnZ3f7wTNx9nOMM5vP9f4a5xw3LvO+W\/mrKLhLe8bdMapqUGImXqJNTftZI8LQpwzHmc3bOonPS39p+AfnA7nKqScKGADwUFn4Sm+ceeLX+NZDwHuVtx8+scpspjIB4l62E3lL5yZLc\/UrmYhAOs03oJ311WUnWmW3k9BoafNfmajsD7ATNTlZDuf0\/tk\/f37P753xflyvFc3RK0LzQ0odSj+moXRhMFPjKIVrfEozuSdnmQDq6qd6On7v2iXhhJDsocC3+hsl7wTylpYkvb\/p8GOYCnzE13hxMIqQdpNJ4FtK5AQIl2NmFo6ou6ycyIp1UyfQl\/UymM1ZSy\/ppP8Znqqjx+SdtHVgGodPbEHNrI6\/jcXxWNfMvtCK9bMPrjdhmBtq7hZWvsATKWS9p0TvdlHHvdoY3YpMuJ+887rfSnIEtz8s7ku1wTwAtA0GY6OrqGUD5MBtjGxft25zTq9Ib+t6WhzS3hKmz45rJzKxbuutjqtantnIKv2PClnM37FNwF5VMAez4qbfimuqD3Wl\/S29L9hZnKgmKsg2fyJs88dn7rEaQdtosHaOXWVpiz\/2S+fObr6898i31PTqFsf42gd\/+LSlTNta19ogAGGZ1lmP\/vL51za3NOaBwIXnikfe7XYyE0vP97xaYevsHJnOCuDUqkzu\/pKxgIfPtJe2\/OCcOAKwOnKXwZ\/zhnfNrBFD0MDDb8\/agQmToxKZivexlV0E7efYyNZRtlficGvMD65f9rlWMMUIrnwgK8YjbQuZbaoO5tVv6MEi0P9zutNhXbFQGwjJXrYTmVi39FQ4srmy3dmrJEJvGxOgJkESTFqwpTZGSLbet86Tp3A4kK3cfMe7\/cZic82V4oQ72gYhgc+ja1OOXfvFL21sHWXHUklduys60LxXGb\/ihaMeBJSUvrmYfG2bvjQwdttM5535YLqo90M\/0yoZysaG30H2sDuRiXVHz\/db51h0jAzyP\/mYemeVc4us9KOhaG2pYSk\/vJtLZs4veF\/yTd1sxz1Y4cKz\/FW41vxuS3aTccGPqLF6j2\/5zTa2d\/vGETttuffo6eaJXkTEk0aoVg\/IzLfG6hjEsVfFtBjf6RRvj4OUjDV3ysZe2AE24c53JzKxPlf28B4WW3JrVshU\/rJ1iV11Hl2dntbB1H5kc+MuKc6vdcX7L9+9tvnarwYDDxZO\/w+8PeO+MJpNuxh6v0SMRQbzUnZ9eFWl2vYjvaVEu5qLyliFoiTosHefrDy6E2fHjakIHCvvF97lqXBVt3CUa0fyiUyse4++1u0q9apQHSG\/lJB5SEouWju72YDGxsv2ys\/yg6c0Krh2xS3QP377alaEYuxshqbgFZ8AAXVLWmoD5tjS0kjxs0aEbi4o+E2QegcjsXg6vKpLAUaAww+0Hcqr6t3ewTcwqix+2EMQPTbGer4qNLx2bthedicyse48eqwVK6GdpZ2tlPVHyneWOtFKJgn9IOPQaViQ7elK+UnHdSOudL+ht458nzt4O+DTlfinHbHbRDvAm9nsVaMeGav\/GifD5GlbdPZou\/x5euJpmvdMsdGw6Wu09FbbnraAia1lpPatajlNPjAPdF\/\/fT2o42siAuxpO5GJ9UDXlC72ikW2kWXs\/D+z1npMdN64xqID7H0DJIIEYyI\/3f5GdzJw7UhDGXwgxtkx0PKJYJrmGcjhSGRro0k817Wr0Oar1oU7Llt2bqfh1Sp3PmDwiuXSLasoFQu9NSXTvpYddEhphGwgjJKdu0mZXNaCn97NstPyRCYWV4F5pcKWDJwV5ZP\/bFx3ldFWVdaSfXObfs5IGbiLgcH8yTtXR5ZOD2omCsuaxQZNvsQofLy8j0Y42gZIu+7PXFGWVk4KA7mWx92l5\/SpnPhWTHjg05ZyibFoXTVoJbaiTKVXwQp5V6cgMNLGZi7gzouDTyxeDT3WOU9vTjYJydYly5xR21mYFQlscOzZet85DI6DxTkMr8B0V\/BcDeyx+MMFgXZuwyBMtoe7lR0p\/o1Y\/VwfXHCCrY2Kg6XkPOuK3oj\/qt7iCk8c4GYLHJ5EQ22bzcEAal3jHdWCLIKd1XjwTGFv3AIkxF62g08sbhvpp0F61NnuUpmUnKVSDzABBtsma22JvTzNIF+W\/g+\/uuePXn39TPebS9excCCOmZvviD2IgZr4ak+30yW+6M2l+uCi3rEq3MDa4PO\/f\/z4tleU9oMsjOG0ZL\/4YEtfJLNVPPuhImhhUm42F\/Ve6QPe1mm9MRL3tB18Yn10674+Vzd7M7NdSv\/P7OusMlwZltUgyeYMxWFs5UfuCsu95p\/rBre\/ev+aENHBFy6cqOmR\/+K2NSYZCg2k6rH3Pgjti1dF8VRpz\/atcGCoGrzZXNeHHT7Vp2h4qkr\/AgDDlnLGaG1iR5Lj4LMGbm2OQcstnvGns2FsvUF72h18Yr158fy41ECfkluz4my0tq2U2siwyjJXp2fsZGL58YFQ7j\/q9yPjHn\/iZavIqK1gFVhMC98WXsLAG0OzKjJc1LscyIV3xAC02VzQiTtPhzxtn1PGmakxa6zRuOJaC8cPX9RFYJ+0h09HX9ctQ2yhWoLEaaf7g08sXvL2iTs9IZn80I7MSiYO7eysjegnLp5zjy8bB4jLDO9ya4rGz2zy94pgBBwVQ4WrRKaOvXZpSzmExQLm2NjjnxLBdWTrKIsOz4CpAbQM7g0d8F\/o6ZB2mwmcwYFRB5eyLAMDz\/QzLIGst00QXnne86vCqB2fMHvaTmRi+eV1dWgrw5105CwVMi1Z5X3JqPxojHgCa3y+VINbkH\/qywzhSxwwOODTleKTPNtC40oufljsuMjGH8UNHjzg6Fhxj0\/pynZd19loL+8SjDY4Hjj5jRjFt8jYAOFXVcsI4UrJpH2lr2ORNVsrFtnmZCTz+D+afVY7zbIaaJwLl0yNbM8Q6eNOjxhj37EJ27CNWFKVPlyS8PUjBfasEq0OD552td0o42ydFKVDi39KxwLTOuqyXdJlByYVT99cNK1mxLf24IoF7\/qzEZI8SrS8omS\/oOuGfr8QT\/ALW7vtsjz4isVLXn26fWyVaMkyJ50yzNNiQFLprEQqnCsDFj++AugTZT93TTqTiysZvTLTCBMF4Yagixrbik6sshcoDELRtvLr\/kQX\/PBSBXvcEZBTXtPT4S8\/ydOh9Q0LeMYoucwpTNrEqLpOGf7zGhe+8QY5bWgM+N1vB59YLMecsPbmZJPgjCTxRi4eySoBk2lJTnCdddTakxonwh\/oCzkYuvDhE\/9go2fvf1MtdoPi2XgDHbNrbd\/2G\/0g3oKnXYlVjNVx90mq67oPn1eHrFzGtW+3pfkkm7f04a1Y2Ia+BdlUPa\/LL1\/d53JD5ALafR+7eYT3wf4czvu6QMr95711trt0cpH9VOohIBMEeWAKV5bY7aXzK43iZ3ce6W4GbuoDUX+LPw6OkUqF2uY3Ap+KP2uJijz+Ggev41Rp79TpAuLa35Ypr+jpkHvGbuteNevZ4eJCkRwDAv4XuUDYbQNvp2CMlo7v3II\/MliA+9sOPrE4x1pP3p3h9I+08v\/Mvs4qT0PZ52rgvMNpGZn48U13nMP5tpziM9r8na0OGH9jhCi725CA0VUU2I\/HM3PahRUu2ul62qPq4GnutkfGKZjrunX6V5\/fcdvBsKWk3eFt7WQHFHuBLduXBklJcV7JnJP3wg5wGHe9P\/jEonPrxHKC0auqOBsttLK67IxMliU5h2cDyOPN5zoBvs5Nfbr3Chp0Zir\/SNZo15iS2+gyLcGSDWUD0ITZWnGXS60ssloX\/PBShWZ4c3uCs7Nk7sLgO7vGV0U6CmjxD0d7b+9kcwuaO62pYPjmqTDnWN2GAd7m2pF08InFJ3QurudY6ojzSjsyK5loTVmqpzain7h4zj3vh32s8xR\/59YWHz7J1DDgUzEKZw11B8gubaHOVvhRW1oKd0FGHOukb87FTrUN4EOdO0u\/1LsFOs8GwM4w6sa5LMvA4J+24AJdECVgU5Vk5tt9bAUToOV97A4+sfiGO15S9+bMVvKM0rlnxchS5xZZ6UcyLhnqvTNSWo2rvknm9n3f1EeW+lF88U32SmUte\/8bu81vBPHU0OYxeJHNCdOKo94P2\/CHBcfUw4lQtio5P7xy8ay\/EO7COc8QxwY4Y1kacpEkhnmIo0r7VFt4VZgLpOEKhkbtZ5tHeD\/8x1h5huJLyHpLhksig\/x\/NPuSf9gnFh1g7xuw+Uof2+cNbj6VAl3zGW1+OKKPkwMCM7eNqFAUv2uGGYUYV9kb53ahLl8jJVTrmnBQtj0hcAKSkleHv\/qMr3cENfcdw0ozD3ac84hx1NOC2PB\/X+9E8Al0xyr+dtl1efCJRdZwzaY3kov8cga5royKpiEpK\/MsFK48C6fzKz2NXOP7IIyVesF51UAPeuwMKJG6Ddv2gsez7HDIK5LK4sXdD6zWrXi7DHtX0i47OC5j488E9P1qMjlWxbBYkVPHTJw1VtdLrwIIn1by+5E2ezcodl2ZR3jXzC\/g4+PtvEnc26h2hS981za7XTXZsXAgDBUulnzyhj23+d7QN8mQ53ws3VvxjQTlAJHE7S+cefHBoeyALI+WHI8Xu3xMoHhWWIhSKqZfa6iY1TEMjkxcozb6opTzm4f6RA0vcjiJz7c\/05\/ydXstlA9xq62tLi4XMTsCT4f+ZJBDe2f9PnYHX7Ge6ia\/dWLNbCfzcyA4GBFUavOeg+FHmayddk54WbF+qE+\/mKUphPPf4o+rY6RSobb5w1GoFQ+7wxYeJrhLP9uIzkDbZYZywSJEPlpe03kWn+DhnOtoLGO1S8zwA0IOTzWkMCht0o5xf8x33EfhJu1rdwITiw7O7oxzh6SkM9j5BwYdhXdkbWWuFMnR2DHzFEt2v6cfIrAV04LzeUX5F2EDLLbdPqZNPIHmahFH844Y0nUf3AXHxIcWmigEJkoVbeI9v3xD17N+q5sUcQ\/DjAEN2oUdksEXc3nRIJDwaMeFad9DWnpj97Q7+MR6rKdCD2p1iJxz3lVF+eS\/mG2pqupkmjYnnL2m\/ZZu772sE\/dCBIpLaypLpwc1A4IoewI4yvQ1svAGtL1K+ZoXulCqXPtRTmW3VMBeadoR+Zre5+Rb+Hjry7y0BPyLto41IFWxD75pV1Ys7qaFaIBfxPon6U\/mHGtZspJb6kNX6pxodrtqzjLGg4lJuX3Ow2\/VcOKe8SJLy6\/44hR\/LGS8ETs8xyIUvGNTAKaXm4uy7J4k1Z+Jjx8yN\/7xWUg+CMLJNq+kA5e12pswFcu8zV+BjhfmeaqnwuYCsq\/toCtWf8S9hsN9YpCTUVX6UHBEkH3oMwFKDjYHzBixoCPD39RtvhxIW0NRbOHqWEAa57qxjQkfduOLf+BLTgyjtnGjnbEJbjtlYhWTO1K2it92Sj5kypvpOR+VD7z8VdtbLtLEMI8DOlj6W75yJJ\/5IAt6E9GmPW0HnVj5ZavtkD4XYaaRRv4nZ6uOHpN3ZCuPKILx3gC+Guj7b1wBqe0IbshTH9aKg4fjl+yCnR62mZGa5WpQmeFMOxYK+0ZbBHgWJSyJ9+Lyhn7ti69emrEGm4mQqjWQ5EEMtm63MbERj08u8eLJsad3fHa83z7KOyY\/SsdL3eVZ0OZkoKpVqbw86mq7Mw1LZa0rErljgqeLt\/VLE9mS2SsOemJQzJ2JLG5l8QC5Envtwx+StnplgBY6HjanJxMPYNseuRzKMe3YbK5y45\/ensotRvSn2m5CR5jU+CZq6dpeehVAGHve1TF8Cz+pdlU76DnWU\/VofYOVTlRyzcpLzrHIUAbYPss51l19Ioc7GhhG8tjlsXMsommTv8+F2r\/PWSqDfWAdKCsChxMRZnhFYJl99DblaFlh5yjl0P72lclebkO8J8u2fJXrWU\/uElCbUO3r9lqwnggY7d3qbhnKmCHxZwt51siY28P6fewOO7HUqeVWLPcnB1Kd1GDn4PkQeEC6w9ZwMKQwjNJSENzD5Kv5hUF7FDfkQT8qxXtERtsqV0sY3GpB6VMmZq8sXaYtTQSm+5GpicS0OFrydioTgG8\/5A1kXyiVTL7wm4tuG3J1lgjhoZQkA+3C\/szJyoR6lt\/0kcF+mWEw7Hw77FOh3iPkDoR16\/MTj6J6y+Dwx3+llqvUjcVUuIA0+PrZtgtnufMSJzawLqiVjNPUxxdd1Uxasgt2euDdsrlM513M1a7GGYsPkePfPI612CNH4fMeqgnmktur+T58VvnwKYi3cBe7G9h+McdiHa0o3vOvnd3wjdWtL7K9FNtHeS8hJinP73mLYurINB7eqULm8petS+wYI7tqTGS+C+JtnewONxgw4VJKr4xSxgP2AUjNpGV1UfaBnDLeC7NihbcpjLTORIHHJd1wXTb+7QTdcZnLJ\/2TdMZNpu1axxrhqgKngpha1Yc6cX\/8RN+maHNhtpl2Jh10YuUcazskueWHs4p6\/ko7O5q0s5ykbs98+QefIYQIb++3+KSRkx\/F2Dj7GLvYoTDTQA3eWFb79OuVYZRuC0y1dRy7I6RdBqRTWU1wkMyK9cW9h2PFwqFg9s3OJFgsYl\/1ONhHet4iyooVfpD72raP8r6iFO+H+lHGC0dOspztSp5RkmFJZetwTYKReTP7GsPPiDBwfPkHqWg9e3M6X62Lb\/QQNs71Ef+In\/lMO\/G0Jw1Ke7CsOOrNB3nZ6QfixCJEflF5Sd8hxkVSrmXFr7iLU1KT2h4eVNHPPqeNXOv7X\/qdavTB0Kj9bAc9eeeX2LkssG55vmeMnWq+6wA7J6hoGAOXGtwgMpy+O0GK+\/pqHj4o4I0Z5kGVD1Up+y4GTlyLMVif0BrgE2Ic0rRqCa8aCSg+uBDangZVDOljT0MTE7j0EuxTPPhRtdJOyNY8t+QTO3r2qjsSGglB6vFEHDWMJdOP0qug9p5+ePwv9ZVOHnM3zOi97A66Yj3RQdr1dSx+MJwPfHpC1aRipFz1gWUEydhWWqydAT7OaxaHJn4Cxl575N5AhDuTfcZEjS6IMBiaZtqtYuMErMq0Y8rcbcsvefg+Kvy8NW+LJiiBou2lVwH9a5rpXEukPjHUd78ddmI991VhsinnQNTzV9rZY1aAznJnIDmYT57wY0\/OWjD6MwuYBWdf222unQHlus1vDnNRi5SaBG+J5X3xOh51x44dKLVyka0kg2SrMk7HZb6F5hNdKGWzp5vsnTUxVCzHDRK0OfGq6tkzr\/krM5Fjs\/dedgd9KsxNftv9cIbSU6cRTzdOp62ESoLFkmzDHBwrlrOjDOVdWTlxw68BSxxUbgdNk2C5K7ZNHiBxTebTDrjDoVJC6ikNH8G37UwHUC8rufDLT7XoZ1qDJVY\/xzJhEsAxw4NOoBpS7PM6lp5Wnz51G+3nGQbB7reDrljPm1jHMtjDrG7T8+p4D4KxmGw2YMPXTF\/TfeIjLT1GyVI4GGzv7TT16PwwRrWy26f9On7L9olbOAkGZ0WZlBBiAeB6ylQNczxkk7+wzA9ZPs4rQ5OY0NzFnljFkzixmNvtSxyuIeqdwsTqtg3O3VYOumLx\/H70AinZ7a0qM8\/RDitpFxxaVRvHV0\/ybS2x91DLusWnHC6F1XMHkaO03UFWe7Wi441GjBYkFi4OUXwIppkOibXYdbjNkgkI+rjMNxPe17Wn3OWwki11YjE\/\/WoDfUXuPpeec6xH+jQ0aq9qe5xcB51YXMc6evLeU2H0sQahhmYOEhnJJg5XhYOPycq34kWZwfUh4unC+PJb\/AnRrxZ56RZE9p5gVAVyoYPU9jBGZh+9sAbKaoWFKKVierWGir3Ubl41sk2W58vcPsMrw2xCd3sNj094TUY1lePF5jXubqCZq6\/xu98ddmJpEhzNvKwU9JTDlox1N31Q0mEsvQLomHjjgPF1kLzdwVf0OA2Bxdyi5GiG3+LvqnaUY8VqGS0G26hG8L7IKNC7dD08YOAztuwhmnrsTCpQLyu5nfipvkO1k1JDqGGqYBo2z5Eh9jokhQy0a9047+HUIbEldLKtoB3VT2Bibbc85wEahAzRWM6\/zXUsPtnL2LEKtn+PJmOGrVem513H4qA4joE5KINJKxYrG3wef2T4tPdqU3pOjHN8sHZMeKWXytrioYtUQ+Sa5G8uuY+Kp\/z5CfJ4xVN8aQDM2dLgwU0IsGd16UJPhIJLSnPbY+flQU\/en3uO1YNPevmfHH5Or2XfXlX0aws6Xxj3hdt\/+iE2H5XIZXcxAI5mboOEXu2hgaFq8xgYZu6yTkqTRItbkFBQtVSVxC2M7QVY7LwVc1M3Ms7TCDMsDUFedV0vvQroONhP9J4O9W088m63g06sXs7XLpA8ZBNZlDrZaA3aCbU9cuMeacViYllr5fRFxNBczlI4YBw7Ayy23eayFzr22mPPtsaqKNBVjJQmQtkuw16dtVwNcLvSDsHxKT6uZd3khyxbZwOUzVttMb71LchWVX4rMStW8QPd03bwp8KH69f5qVPOWHruNPITTbrqrFqqsqNKtpFvz\/zBzjwNTkO7rThYhtyAznDJ4S1Dy2hb5WoE72sXzqwAqJDpT+opiT2Db9uZDqC+qfSXpmnFSgAV\/RzLhCl+YoaHUlINKfa+jsVYPeH0QW20H+O+p+2gE4unwrmcp0fOUFXHqySf2NTg1eh4cDQIGQaG0A7+YMClWrHaPwdRWA2+B7vPjeQcz+lvHuE4TqR12x0HPwfmnCTxDBMq+oohIXZZK4aPO+2Vyq0AwKxTAZUD2QnZmpeWrFh8MpoVJ2+2xiueabvr7NzIVDy2hC0jL3Q4Bq2nKfvaDjqxclusezn6wzh4q0qmwxElIgemNqrgOHl\/Ta+abLG9uWXd4hOmFXDEIWzmgr4cMK\/2gm+3C9fWJBYu9is+hIURB1yMsd5g2s7qkYnANHuezPuEX+rk\/YUbsUTxTdexiMOVC0Jn1Hq8Xsj8RxsOOrF+py+dvaO7PddtdK0rXg58DApWh6cynFFxVTjOsW5cPZ\/D0iuA9HiwYnkbcunrIGTZAciBZYu9+f1qT9oc6MVu9sj4JRYV1Uw0tDbiH0PsnkRuQ0dNWc6iOC7zVMg39HCphm4aMXdWtOiyOSK0VL+lI3iD6caetoNOrPf1M2o3+aXPZctKQU9zAHIgIqJhc8nBoF5KJCYWX1vU9oE9grO+\/aqENX7hHyuWlOhtLSwxW7aqGpFCFuzGUIa3SzyLkGZs2ZlEoL+pnN\/hgL9I8hw7J1SFCA9qKTSkxjpqdlf0lNqfK8zc8n5B7K560In1vGaPcyxGQlsv59\/mOhafFuaeJTy3z7HEI2WOQa1UOhhZm9DaIX6lxSGWWsFY6UwsOQHq6UY8Jo++r2Ot7D7uwvTxT9fCDlUa5ppM31xy6wx9nVu84imtGzit1eDBTQhjKdWpV+4cawzEMgbJQCmqwgF67ib7sKiCxPtel\/QhCuuPpGeL7RW5GOIwwiCOFct1TNIu8ObB0lvMsjSOUg+LUpZaiqph4wGBdUxmJjIjg\/b5sp4J4yOE7yYtrMRscPXMscYRVKuyTwfKFnjihWD3++\/AilWd6qzzMjGGRMYaHFYAJI0KUD0LqnzNPx9nffn3KvGiV4Vn5J+VyEeCFPbKAqkjFb9foidgjpkPOm2t9ki2WRqHztGSVXrHoAStHYCy26vssIUltRfJPBWOBUtUXtUJ3i2QvUWXkVYz4DSjyhit3svusBOLXvdxqe54peiB14CMPF9wrnIwcC\/9E05mlcm8hG47lGUeuOZrvy5Bxi8+Y8WSEr2tRYbP4BlBpLE9ZTA4FrJL2IrH1dI7Qaq\/TAu8XlYyRP6KzW4LnNJ5IhVn\/NHJKIPUtvd1LGTcEht\/e6uy++2gE6s7vnZjnGNVJ9dzrB4dus95TYaBodnoOwjyhrY\/c1d2Gxg9IV+0YmVo7ZBBP7pi+QDHnpUtKyTLXJg1BdKgxJBA0zMxwu6VivbKwa01XjWVVEPkGi1F882l+PjSNP\/4AjHtY1c5FwtKNzKVPpeifRXZ9taX916Kg06sGuatjnjg0VSl8r0wwyr7rFP1l1toeHPOgT92j6DJGt58LZvYVMWngtpYsVwHVfaqNQ+WbK1R2VQmKk8pB8MAEGfaaS+oTAvQL5axcAJ\/Th86PbYRS13vpBxtr7hZsXp00t5Ok2NcO1IcdGJ1dq5t76kw50Q046D04Una+chQ1TOhP\/xKBuPRrwoZXB8ilgu2IWe4n3uOZWD8OPLw+9Ue7vpLi8re7ZHWcYVx0ziIBtrZ7cmKhT467PbyRDA4csWnmGO0bSeBuLziV8HuYNDtarT5t\/WLpGbQB0VosJ33szvoxMqh3e5IVgp6mtHiQHpTUbWUHAxQpeQN7T5XsKoMw6cqzdd+XcIev8QZK5aU6G1tDutisKpjRXCbUCHC0xiXSPxHGPa0nQOdFeubShLoEeeVisEbyfxrjvAffouZ\/N7L0DGBsBHDfzLYLzMsxh3vDzuxnDHbPRjnWOnqWM6\/6TqWD4xGh0xm6xWrRxO1x36sWDl00drBEVtLGufY16DjBzUHwWXkfsXXeq9sjhW\/xEx71nMs2GsuVMMgnStUr1QvKunnvYd6W+eag7ntYYBk1MxZDRam9Coage6VO8dKR3P4MgI+bum106uHv61LKfvwVGV939F6+098i+0VuRjiMMCI32rFao+mKZ4Ry0SZN0y8glUnCZJq3Ninv3NcXiwzMTivDHt8JWSjAZ45PX0cQbYqO7nQ0C7DsTU+NLvcH3bF8shuN38kW1e8TIwhEbgGR3aGoVcq1oceFuuHf\/hf9KrwuedYHmMOKttLVqyypyGKr8A+SGmYj5PbxcGjvSL09BrAOpToq73bvcC+9mrK3K\/OB36HxjAHlqq8JMY7+7TTZrecHatVQhdmWHZbOejE6qe9tQteKehpDdrI8xxlQ13lYEkyTOXXug+cEYq2\/Sdz45pvyIO3LJLDW4aW0bbK1chWFVkK8WCK2ZXGuCyechk4J4iOPK1gWnxTCcL3u4uIP\/6ZOJ4e1lEHRal9DQn2vo6F8rFeACQ2QHursvvtoBPLo3qkDz3ZRgb3iuVXdRkdD44GIcPA0GkTDnloe5B8BKWVvwe5nwYsm8nu7f8H3fMu95M6x2KcZhLS7zzcmR6b7p7HQhOWkjmGvkaPZbT19t3T7rATSz2saTG6M+SqZDq0eVhJu1a6uuJsqQkVkKxH+CIPpWCzTs0HrSKAPcq\/ygUrhiWWiYpZJBUB8rjAywPJOsYjK1a0L5O3o7bkkliaPN\/mOpbjqwE5Ep5xW1S7Eg46sfhxSo\/n0vrRta70ijUwPgyddj4gyUAB2kS1lOt1LMxTrkNXB8FHghhksIE16WU3Va10eKVpZe+g0qIvV1VUk8LTxDFkl8rTC8Ky26vsDl\/sdqY5L5SLy4jEah9caMsoI61mrLGrLRkqe0S\/h\/1BJ5bffjnSn6wUKH2IciDoqA9KeoyFA0PJ8fFmGR0K+ZdhMQdm+zA3TLZtvrFiiQAOW4sM6pat6lgGTp62bZWw8W8lZeM9Bc3LZEL7srI6Y6JuC932cCZE+aOTYg6JXXv3tV5Z0gb7ZYa1aaflQSfW8\/oxzrHSVa8w9PCbrmNtdGcDfJ3hvWL1EcTGsZwrVg5dtA5QEeuIyyG1GnRWLEafg+Ay8nqOVUfHxcrulaobIAoAsLs9yK5AOtvf\/XhRCdbX7IoX7zBQGTVgJWeiRp5YxvuVO8cia3Pw3F3v0OXIpJLhn\/ZRE3D4uhK8f+3Cgz2sk1e19nKcZhj+YUf8ViuW+XrXpSJUaJeqh76Ugk1AqtOe6ZbJhPYlMuSeP+CChdrbsPUEw85W5Xhar\/hSE6kIjdz17vArVve5ejKSrSteJsaQCFUOZBqSBhFoX3HnJTi\/cru9YpGVmVJzxQrTn3ody4feDSEG7dHhsUyFGNJLSXuef46VLnV7heqRcPkiGd70uRB2c2A3oMWwZW\/qbp\/Yg874RarQeygOO7HGIM6eeKXoIyR7rzA9n0BqbHwEKTmQbD6YKlmxGPRhsFW6wjXfkEsPq6vaUX6rFauwTR7OxKIOD7atEol\/K1NSdYJUf5kqeL2s5LodE8svgIqTbnsKVcz4o1OEGhLs8zqW6iO2Kj2Iqu56O+jESre2uzDOsaqTrDBsnGP16HhwZC+L7QxyBs3T6lusWDl0ow2KY38fUEL5cBA5cXj6SIBakSL3asRMockve6\/QR5HWCgd79ShNwNmmb1fCwMfA3LhqezwhqbFB4SCp9LlUQgVNvfXE39d20IlFh+j3ug25KpXvBRlWjuBwo+ph0o73DG1Z7Ixui80XuTjiMPlUe+mKhX1tedMUz4iFrEfU3ifGABBntWe69RSnV8R5nkz7\/N1iC23IiSkvJowzAW2BKm5WrKCpo86R8CjGsOP9QSdWdW2rC6NrXanBmeNXtaSdB5Eqly4YP86xcO1zlh7TnZ5jucU5FA6agLViKb7lNMTTwgda00MqT0gAOZpuK23s9tZaowiQsE95TBaH+yxzL+aNwcVeXTaHlQOVdiq429sYR9397gQm1nYnslIwAhptdXasDD4owWJxVqaw0ve76x4lf06u7DbUrpJ18A3ZlcSDd1uPIi1xOxw4mJa7JIx9tWsew0vu9jYh2BX3B59jKYP4qH3aV2Q9kYbY65AUsrl9NHTZ3A7tGIGaYYt1d9WDTqxkynbjxzlWZVAv5990HYtbdBkk7iT1NGnyGk1Emf304FJpXsOZBmhl9OAaBXCuSNbzlGHiyvCSvQqVvo5O4hc7sUIZdgdT1ewyui0oq73dim8q8esVi4bBPiJ03+Fls0xvC+H4Nvg3C1+5cyyPqkfe3ffO84D+VyX5P+2jJvtwVUWLlc+vuEfJ+ppQjW+xvSILuZIUGNVLz7HsFkfvUy0uRSjZZdtmIPdtqIlFXIOZbj0B0L5YfqxvO\/bJe5yNhcYbXJ5D3kll0CxJiiA1J9PeaBpfxh0WB1+xuoPdh5FsXfEyMYdm1GRnGPwUogqfDuZSwxN+4xj98CeCsF6hVKtBxZzY1YKKwwkLq9C3WrHMrAOTgIkhwdxqS8eAj\/a4JKrr8cMVVbc3vUJpCy1H0HZEVhwmFmnkbwSzmV3xl0t7IZoiZoveVXubfxp2WzvoxKIzl\/lY77J5pciRkTYZa7MGpDdXdeAoSU42zasNP5z96LkrVrISXLymn0kwlKX5vtWKpdjdFjNUg6JrW5cjshXEKXiVWalAMZm+TUky0U5fioFMs8gTCZ3FXockyUBM7H0dy3UiyWA\/xn1P24EnFt3f3sY5VnVyPcfq0fGAkPV2DcdZ5S3fF\/VYH7Nve8yxe65KMVesHLocXhnI3IWPVSWeNeiy699Hx00reb2OVUcn8eVtOJwmCrtDqDrZaZO0JkUf3DeVvPolmdRdnO01IojLdXaDW+0hhuSEKqPl6GHa13bQifWFvpXu7pHveWIcvFUluXdEiUj61UYV3HmdaPHrWLYsdmAtNl\/kEQREsaX2rVas9mrXBJ6xkNs2K2tjbI8be6YbE3LMiOfKtB1E3tIZAaSpTQCSoJNyNKIGoa9j8QqaX0kLX+I3xa7L7eelXbMf4Xvv9Ut5ybzoGTA\/GBge9VfaibQR5MTxk7YPH\/NbC62kloezVNXObWevlMHaIVhj4KQSIUXJTd287QozwFHGHQ60KV0rg6EdIjqHYBc8ZdqxLfu7W7luN9XxiaO5HNX+RoG03u2oKt++fEdfI5Vmhw\/0PraDrli8XM4nTWZXslLQyZnBtkrs3HRJVoIqJRIr1vOvvG\/j4Bt+riTeFt8AJK6jdSyVLXc5OOVnmDEJFLn0WPkv+yyzUoFiUrys5AWKfxeadxkgz6uCzB03JG0OD2qB1EVjsdfGix2u\/71y51h+VcPALFuynoFJBvVy\/k3XscDxwwH3yEDx9ausHk2yMscgZzd5lZgYDi\/\/SNUgOaRWLalzKvic4SXnFR8BhTZBc8bPHN61XlhVzS49prjF3q14Wcn3hvoHRNMQM+AdBiqjJqFl2lN6FdSYWPwCmMfcbTR6L7uDrlhMLAZp3Tg+7nVVOs9XjOuyD09VkPgq7q\/41AkA+0+vFtsrsh0L1JYc7D\/lHMsNaGo3xg3aasxQS+u6G8R06wmA9vky36xz+fw539kQ0mBHALg8h2oiJUJHUsAkjU6x\/AIg8CMcg2w3lYNOLC\/nOcKj9SPZuqJBYKPb2aomOxYv466c2fA7M7wy5PSjzrQACCWslhbXalChD1PxSR8aHVgDM\/ig0PtgGCA5wPBp7ybiTwyXeMUvMXGXXYJb4Xr8wh07YdKK1F4kk4yX+bFPO5eP626YFMUiMZDsLagNbr\/IaRvnWZELQ9A9bAedWKxYnBOtm1cKeloTwgcCwAJzVXbKnpdIF3SH30O9\/rauDSaXtfybr+XJe4SvAfJzHPbN4WpkqwrrQrvoCh6YG2p98YBFniUTca5QsLxI5jsbbvg3rzMuf+x1rHxDD21IEowZ5zHb7e6grwpztXy7AzzfO3eYXP5HTr073nZjMRXuot6U5VYST1YrjXQAxOajEtmO1luXSMBkxxZ7ipJtCxo72JBRtnH6BWBQA4wvagxLPEzt++Lyvn5QnS\/x5RwpW8aI8N5o11aAWKxTNJu0w5vkbn1576U4gRWL7x+YWw+Vey11rzBBDGtSvdyS9c\/8VEgWci3rCk8Vy9bHoPkiF5+LyU3tTz7HMge7bsSouO2LFIgbNFesOD5f5lXhm\/x03os2cfH03C98RiNqEPo6FgnItTDUmWZjar6I+Y\/WH3bFUrYcPXmna34wMDzqr7SzY0k7y43jR8YZdH6sqdKy2SxCDJ\/3i79Vpacwou3I1lUF75aFVDUO1DGMMjjAwVC6ZkP7hWuQhsM02vHfgCqRWaku+a0wYhq27OyUWKlWA0uQg30kMrnP6hINcnYq97QdfMWay3l6lJWCntLtZKwtEtGwuSQrqZcS6bxGiJP3Ww+ebN66op\/vXbYVh7rlVBJvi68BUkZfgcqXeEDcijLZRTuLtgUcOfrGxzftaB4mHvZvKh\/oIvDlC+dm7Lwq8OSiJzSAmOHJKEqYfQajjfvlz2nMDnGOdfCJdfTkPVnPwHiIxnL+ba5jsfzzm8k379cvYzF6PtoqQye5eHkFh70NvJqzHC0ZnNpoSWTxOcP9XCMHgUxJHBOMQBbN4V3FxUVVs+NLTMttf3nJJQLi5ynM3ibAK55URk1Cy5mwkYOlyVmxhG8qA3a\/O+jE4nJD3u+aHfE8YFyq0od\/Iqom+xgLVVrirspb+sm1UAzEMnDRmR6qAWmGqP7kcyy3aZu\/Wq4AijXiltaKuWKlFcflhzp\/vKwTd+xQZArNmtngsiHWcGGpoJrZ1PgUdP\/KRTSNN8tOdwc+x+IXFqqz1Q2Sje6xcqXOSmIN2tlZ2yM3DvuVi2f1fqHucAhJs5YMIlw5d1E9orlta5VJIwx+k8rF6jiyNwfMJYQ7OGxRs3fNBmOx8TBHKu3bhqPyQ11q4I1jhm22d5DAFH5Y+dfDlSGknei51sepQ9piIOC9bAddsXivcPunO5RTzjZ1cslg93SZf67KTmkYZWUjV6TH1kas5d+4lsttMLT+26xYYM3X3NUgi7aZNiGKuPHxTfvjlqcq7EyYF5W84uXiaMZJU4Y4x86xHKV4mFYC1ZAyffp+LK9YWNUYT6vMwjF8u6wsR2WXtM\/n4vzq7SMn2c5Qwfu9vn7J7MGr0fHgaBA8GDlsOLh2VedYrIK2ZhQdnDHjAMLn0udYBqRx0m\/xyQEcXtbjZ7hkl9q5dGjtcvCinH7m8A5wudhVyvxHb1LsjXt+yW1GP3jzstrQyLCCjgeVsqEgdhpsH+SEOrP5+PbDDT\/U5DEHt8ftoBPrqp62fnfrwVZ3Rv+qktxryLDmQJY62R8bA8V7aVxE5L3D3sCwNV9kKQdlW6L6NitW+ExKtbiKs6kX\/oDAzVirjqmBJdMCx+PyU\/XtKq8IxdFJODi6Ar8mVSfl6GQ6Ld9Mwbdfv7C54dUvkdjva5tHYl8RFl5OHNmqv66j8UM7zAxyBrothpUR3cSB9kei9BTLTYRJzfg5VPGB80FJAERY\/EfdHrZF6HaET3arjTK2d+jNE8AIH3XwIDAUtLiiQ5l2vVh+oDfZr2hVzqSiH0QE3zuTSIyh22SAweUjM+POux\/GBAjJXraDrlj0gPOs3L7hkXEmZpRmxrqnEtGwuSQrqZfSkuqIb148v\/lMy\/z337gsOYAt3OIHQZ7sjvBNBzOMFax8QQOxV0KkLeYDlLbMstpRivgKA87YrFTwMSmeV\/IUz3kRF0d9\/Y8hg\/bYOVapzcNoClQTSeixPdX3P\/DpplfuHIse+mY\/jWx+ZVD9r8zJwWbMasJp8DyOGSOfg5WlxlbDJwX3oF+7fM4rlqkYeLaANYpVGQfDua3BTckh8bGSc1xHSyKLP7wEE69ApmR2mLr4bai4JoreLtqZHd9qW0d\/Wcmr3RtXL+YVoRrRkWCjPmQ3EOLa0uBCSef4iq2GZ8WSwg1ph92XB30qpPlesXjtXBvHx1JVOMw51I2YwLGK2Acve27e0FMF3wa8tQ1zVQKNi+vbcczdbZDdbUDWFjXKalnU4aIN5Rew93jVg0J+wNpEWYrEfb5879GTzTX1DU9w03\/WoDLXYp2RwOnBvx7rdayJMcPOdwefWBf1HL++rUNykXmsXKmTjdagnR22PXLj2n7t0gX9HEjeYI1DuHBvrpzLWFFuFadVJo0w+KloW2VreldluIMbTbZv\/CEwB6IecUulfSuIigKovK2JdeMqb1Xhv7Z3kNA8B8bqfxWJgIwwYzO5cndDfEDuazv4ORY3mi0LljPRA0CvNQgjLxFrc7Uy1jDpB0711\/Vq8+6jx\/6tGY8r1vJvXMsxgIql9durIRk+G0AVdJeqZqOU0qIxpi1bQLZiW+zNw2TA\/qKSj7Zd0\/mjo0PHXIFnPK1bNdoQnowiWOK4p3nu3vChDJ4x6Bv6TDwqu98OvmLxY0Pr+4XJRHWsMpXB4c89d8alit1YTDYzNDzySufapfObD7+874GzcphTMZUdJdttRAp8saUKzsARb64a0Y822qHgZUqQ7gttr7BEoz58YniezDWsPBVW393SEBRzNOJqfyvg1madgjmUdkw03lJrvUF72h18YvlnaOlhbdQsVYUMdpbbPnFJ+ci4BzPt7+gk9\/e37hs2XG1mJ7QL7SJGZ8Fo2bHFPvjt1Oo4sh9uLSx+wzYDmaAgCWaOjpVyxo58Vx8SeVPJwlswBFxX0ElSNZF7PNwek8fg9qfvVLnOx6U+q2dDj9HtQnHwidUfE+\/GM2x+aOfMIsOiKUshk3YWGhfP7K\/riv49ZXje5E6WQtNcyWgryq3itKr5l3a4QbRi5aEFkr2rslcLcLFRLoLq5ihV3LTn34bCLzJ9efPyhdDQi+Jr+GhDSEAUn7hsNBkBzIEfJ+\/jnnfzgd3PdvCJxXWU9QUcmUgGjdK5Z8XIUieicY11Djv1sOH\/pi453NXJbsYrOJJSNRDhSiDjYyk+cwC2Q4rCmqN43MZSmNfUzR13h+NY4U\/cxsMR1cKPDsPx8taDR77HzD6wqOI\/w6dczgvPEhuf5cE5FifviUlj9rcd\/uT92KtCzTRt4+qRTzQl\/wHXsXB5Q68MmVgPNWt9gsrRMnH450VF57YGNyWRQbIixGO0ZEs2HiqBiJfvcCBA8dtQoomitwv4srepo7+o5BPe3NXQLCRM6olJfchHVx\/LeVEAGiBYzSvdj3WYzxUefMXivb31cgOd9WBXxVkZjcdk7GR3pqGwD172LMizzffeuLT51ed3MuDDXJWGLvrEivvIYtnTlKoQxb6Ru2qvFqrtU0cNY0Vw26Mxxmb49N++VSLza\/WP9dL5Db5nwQ7pe+p2HjQxY5nWWS+9Cuh5NZ4V6zkc24x\/snTwieWOLdcbOhNZMVInhzsfR04q5bBHblznbGk3nMB\/9NX98BRFc9k3juWWOEPlipz4d1EVDfEqSzv8M4OHg3HRlZMExxdB0+PuLaTSO1gHscz3K7zj61dRE9DjA7n\/yweBDf62WcUOTEqHUJUPnnBrctTY9rcdfGJ9cffR5uM7D0ePyFDnFSWZVX8RsFT+2V6YwnVmNuotTSyeCnMbbxyLvVYGHMMxIpkLdWw0JtWqQGMMfrC13soGq0yV0htORscQzraBRf\/88iu9of726xcnDTwjdrG2DIr64ItsFDr7AnmmLwR5vPntTV45p0247ms7+DnWj9++svnsnu5Rr61XoT\/2fiwGLtuZzdvK8i91UHiq5WW6n3LrnM3nWJXh5Oq3PscSlzPcJ1Y46j8EXhRqVwYVtqlcY0n3h5xjcUeDP6C6sHjVgdab16eKIAWrEPqOnQZLLYXaa1FGPpDxV+9dG3pT7Wl38BWL21x4+6U3apaqkjWh7V0CUp1HV+212MPiyfWrz+5moG1mp4eLLs0iFcpsI4uBGFYVmVfZHt5hwLdwW7rSN78IwoG+tlL0StOAR5pUvO\/J5RO20NaKVK7HCvjdjrZUY4iBRQUPPu1zSeNvdTG3x67LE5lY3JjXG0k2sk0Vcq\/yryEpSbuknh2CsWfhWKE2mx\/euLL5ly\/u5nrWNnHxqCj9GifnOsRIGNuWeG0YlLC14LaFPro2GmDCFWJkKRIXLgJvNrf1wZB36mmwWTD0ym7fozt8Z+ClXnqo9XioL8i9fP4w391wIhPLF5NrcJxN1KuS3CPTjmyyO7tRk4HOuBUXTw4KV6091jazs0MISwxDWEzp+MGlKdQBa3MRuatDv\/gN3aikTfCE04bsSnF0xeKpnD5U5Crxn22tBk0yuIYH6tVbdf71ePBINw0eaMU6+DkWHePldG+eAAhdqXOiHpoxSLKTfwxwJs32dae+anPDV+Cf+GP3fNyMUHDhE85iVhz41utbbbde9j6XGvFkGNevMPJm8FgpaEHFMJFZogPqo9ttwK3tKZuH9wff1cSq1hWMFQsEu+qp3dgpmIwtuowUyph9vqmvxppX3hsjhn1sB1+xrugEklduvXUmutQgJMep1ENA1SwPTOHKEnt58k3KP3rr6uaXn9x2iOR5Mr45neAdyVzQV7wuWk7ooKUz3yjbGBJcBKgtgj3ABxIb9VKs5R09DV7VPemchzoOdObD30zmd61lGKkDNG87lQ4m6Rlz38ZtuYE472c7+MTKybu\/+tc94twh2aa9\/5FTn1ktKDg\/XA0G3Njix9sW7+tC6W++vFd3OoApPpfw4BR8M+RcJzjsQwbZeOI3RyhitAMKbU3oSsXAL9QDE\/6Ok\/KmviqAFdchgiw6\/B15aMPcYuwjNsG0OYaUiHzHBd8nBnnrDdrT7kTveotvAAAPzklEQVQm1nrbjHKHRMuORKq\/9NeWqmKMnOSkvtgXP55KeBN3cuCLVGXVE6tQJo198C\/x4otHaOzVQhyKKEUCVgTZV0h8O1ZKALf0VQHfe\/NStXWlw9\/Bmny7hL\/7FvJyxiexOf3IF4tIY6qX8G2z\/1HSwScW51jrUyG55Yd2yerOxbZUv2xEN3HxnHs82chMrvD\/VlfheTcfRFYIgliMzvpSNT8Qw6oCcpFVjQNELQRgXHTlBD8K2Q0xHgJtwyc8XLvibZy3rujCaPMWDEWvMuW2YIrfcUIbY\/Qdmw8Kcx2rQzu+pf3sDn7yzstdrqf0lkxkJMkgTnErk1R0Trl0Vna2YQsgNtiSme3103df3\/zTp7f9\/uG0ARsRzJ\/sRV3RQntcLv7GNbzS32G7TbTGenOlXeBH5Koz6dBR8mrwvWt6NWhiJkX0iPlKSnGOYTKBZVSi4N88KbWXYbRRNq6PXfTL8bTHfszSPW0HX7F4pcark34jmkx0\/yoVGWT+\/F\/97kGY2Ayis5GBCUAilTO+Rfn7+vQwbx+xcoUMoDbHi64ilXri3JTswo1JvIkvwRxWuY7cbUgZvHHDzwwYjHVbTRVfvjFnfOK56QL13rHx9ZaWC1aiiVpKmyQNlNrHjwfkomv64UZMj53XDj6x6IGmli8HUE8mzwoZzN+xTcBeLTAHs+KmHzgGkeX\/Sx0wbqMZlLjYLfhmCLck\/l1UhYaoyg5Mqt5HbzBYMNq6dKXahN8CCS4KOPl+Br5LlbekHGHBhg5\/W+y6BIkM+Qy81EuvgssYD\/VpcXCGb+FDs8v9iUysGzqPyOqS5CLzshosWebUHzlp4LaPvTwWQSU\/UYDjBcJfvPP65ue\/uxkmrypCDreRz8fsWYDAFrPdkunWlL4cg2t4XGiFH0SBJ5y0rrZS0Nav9N7pe\/qwrcfAeLxDBMySKuEqW+nNttqGXhU7Jza3hH\/vzSvFRWGg3fexO5GJdUnfdsxzPltnoktlFnnp3CStklrJLdUHpnCgzVF7++EtLB\/2\/EBPh5\/pTor+ZIr5zBMv8DD4QSw\/qjgqFy\/c4PApxy2\/GMpoXNpjN9RspmCH6zOdXz1UWy+5Hn5MjuAmWSou+2Bt2XyRbcONYIVJyXWsp\/kRgtYbg\/N+toOfvNMNLpL2xOpVaBd3N5CDDCnJyIF599olfVnIU73\/pm8d1osGvioRo3F95d1I1L42bobk8pSlFGEy31XtxhX4Wlkc2cHBghIL\/61Dmf8yJcp9PUUB4ZafrFjDFZJiT+x4REt9yNUnKxwPi07+MxB02Z8858tF8Go9TPvaTmbFOp\/vZ6dTjAOPrjAh+MvWJXbVK8tcbYdCQtB+znrpubHtL96+uvmHj76qD1nAU4\/Cd4SsFMRIGHN1VhskjeSqJiqCG4NTVKN0BTw2fCfEyFJ8om\/fIQECa3xxQR+wY0\/tkRr8Jmh9NYYYWFT4ynv9VqTVxdweuy5PZGLd8CeX81TYmUdW+UFGOfXaUl1ugMTGdc6CdCbaD3s0DOYH169sPu9Xh3Est8QZKldoBP4UVVnirStKgG2cftUEtycs4ek4MmQrBV\/M+0O1MeGq73Kxgn3V0yfZE6rMGFFMv8a33jZBHjx5Um\/pGF474uxnO5GnQt4P+13dRZrVhQEiu3ZzHasS1Yzvv6G7HfQhC8613tDn9HjLp\/LZZbJX0UclLWl5qpP5vWoN\/ah4bYize6Mo\/m+\/snMcS\/+VXrHyxXF8kptlpduVSbHb61icEjDuboUCMeI1a6ntfDuRFYvn+vUcy1lWqZjcIwtnv3sQvGIg2BxAbIwL2Ryjy1T9HtlP9erwH\/Tq0B\/+FGbg8KkhbZ25pQwH2MRrfvR5RN+4EDWb0ez0P\/HUvaEXz6f66iWuXQXYOEprGmq7Y1rDDib+arPDkCC3YaAkP9Z7hfmRBWltX\/DNs8PyxCaW01YdIeGdqVUhb9fcHX0lo8Gw2Yd6yaVsvxXHNaIf6ea\/L7Ri+WLpcEucZoiPJP5dVKXiYejVyoDWGxw\/N2PspNPmNrntpo5VJl6lcVMfF3Jtcbi0yW0IkqrtI3bJLnrncQkyqq5T6qF\/Lr9c8fe10g9Q3gW+h\/2JTCy+m\/3+43TMyaaOOSOVRCPLnI9LVgmYTEtCggPN1vvosJfGkDP5fJ50\/\/fTO7lYavORSG6IDPy7qAr8JbuNDiiFS+0Wv6VJGPxwm4QJB07aZPr8zqPND65f1ouKUqgMPxX+bbCfJThiGKWBdl9sdmMHSUouFL9x6ZxfGYcLs4F472U7oYml+951MsnWmehScy05S6UeYAIMtk3W2lK5V9kOg31DAQ8o3jv8Px\/f8nh2xk4PsIMYl+Ny8TbOHEdwcaSxtDl8jiGwOd0SGzef3nng26iNa6xx+JU\/UNUtYYvBpccL2Wb4yw+VnUonDOdXXq0WriKO\/x72JzKx+Goe3mJg21oFSLL6I+E6q5xbZKwfUTt7DTINYP+5JBv5NwcfIniqe7Qub+7rJN7fsBzC4QED3HGKn+XigQtb4kuQfsCNQRdMSqODG36lE+wLXRBl1ebFxOiHORMDDtM5angdm6o3vOIZcfq1TNl9ov\/ECmlhRwR77Hx3IhOLQe3bk51gdKsqyUunVimrz87I6JOcw7MBzmQEZ69Ldmj0EXzFvK4v2fjvv\/my3pg+EqmyHPzgt07O5sgKUFVzWm8wTlGNMkbtseE7IZ\/efuRLDFl18ItxrELNFYv33SfQxzb4iyO2IiCo9Hwz4DtXNbFWdQvHyHajOJGJxQ1nZBCTi8z0gyzlUX+lnb3slQF84YKZ+87hZGpwWVo2fjr4iV4dfvjVvY64Han5l3a0b8cbq4Ywjkq5+KUj2NhsdAww4eDNYH2\/xNMnem\/wknSjxaGzTAPaP\/QoevVpnokBD0\/8sIcgemz39SEKvhIpPobXDux+thOZWGQfHeXTNM5SZdIolUnJPu2dcZVoZKUfYNHZib1la4wvv5jbaPx7usIN5F\/0\/Q5hMEtxlEMXDgJXKEAm\/ixxdBsNSkOosoHHefpE96FuPvzR9asIsVF5AdY85ise4RJqyqtv0UCcFlT8Pnl3KHM4OPR7205kYpFF7+umtrt67nfWkmWkmv+PZp\/Vtk8sumQkrslEaZyuVWLoh6u5T4uTeF4d+r6wsMBgfjuENlziK0oA1qUNU98xRxtMZnTozBE815J835VeDbKZqxs5cMG6X2CCLKwFa4UqG2I1epiHl1Ek8PXL887U0ebG76E8mYmlTLqh8527uo6TDFTPqqJc9N+xvlb2WU\/C6c\/ZOoDTz6sI+gViqzi+p5P4e7oviZsApwfYAsPNA2frigeNZFDoU277YZqbEXjFT+Intx\/4nqvcfAhN8cDGv+WqF5EkbcVROoNHHTOoIKPuevS3mFhX9CaL1XCBakw8dr0\/mYmlDOPTKHf0ytDJpl5lJSBDOxfJumSeO10ZTT0+077mZ+ylMWSxyvGCzu\/e0qT+nx9xn9bMemdxNWbwU6l4bplka0ZZxjikuXHB4IdjgJf4qS7Scp6XWPSj48vIv+WqJ5L9MB6zCWYnF45SHK03oTF819b1cY6VthQx4L1sJzOxlDJv6Rv4HupEtrPWpZKIHObPaZXUQrI8MIXrrLO9\/Sjx4x\/D4Gj9s80PdCX+5v1HuoU5t6yEvhy6MAc+TRH\/tCH6xGiHbiNshI++8R\/rLgbeUunfxWlf445gLbKDx0XFjkH7RS7Q8T4Hw28M8YrQt8wsXD0uDrKH3clMLGUmrwq5ljWylpT2\/8y+zqokZ2VtJSKokbEemPKr7DbXArHVMc74sgNf9Prz3+uCaQ0q7agGOKxl6VqNzW21buobFyKiZHNtYPPLW392QyftAsQnZTysHPzGDB4qxJvcltEVRsbBaZVkNnz4rq23da9XFNYGO71j2\/H+ZCaW0vDHb13xPUIkUSWSK87GaNqSLs+lI6uIMfasIYkngrPXJTs0FMngZOqzfHnI5\/c4JrF7aRCYfxdViXMYZJDWgJSplwOWZQORNn1+96EP4w1+ib4dVXo1swdCy6k3kSRt1fZWHi3drtUvXrSLT\/\/8kM8qsk31FGzY\/e5EJpazT0f0++rwuJaVpHUeJhc54nXU6TczoGaBq7bF3vvOYa8I5TJ8YB4cZ3xzHSfRv\/g4H8UftgpjriPx3O5qi2Oya07XkQGwRQHP72891Mf+c7957LLxL9\/AVzn1JkoTqu1CO1zT29tEWIqzjdHf1f1e771eE0sqWylDHMUe9icysfq840d6Z\/\/3\/oa5ylYnXbKcbBsrDx0vWQVVcji6mNgXvsrCGRxr7PDoj5speROYSw+CTlv5ObZjOox9ut0pTTr8iqTDGY\/AudwDnefw6Wzi+j8dsK91UUbumOjcLu8HNq7yAmdMGpz2pq0y4mkM3574nn6n0Jspow8m6n3sT2RikS38\/VAH9gueJjqDSLL6UzGSCrN98DM2OOtsy86rDv6ACucS96FPBDTcssLB+fUXuhpfxIPfHDOeGaTzKuPSpIlFEOIRg0KbaxL4TtQP+roVVv4dJGU8rNzilsZbyopburDPWHKEbFhnXa++9SIp93zJbEi4Spg+O66dzMSqbPtAb2v8Wl\/ekUQi85xnPtjH+omPM1GWwrkygEwRM23hSmVbshpMHry19L6uxvubaSrLyxSOJZ5bRhuIN8rUzZfQWGvTd37qaei2Tp7HgcWb\/+KljNvUWxPRPG2fWNTRViAIj+hi\/63eYfjr994Y39kQN0Ww+QjHINtN5URuTSajSB5uwPvbH1zf\/Ldff1kfhec+pYf+YtcMuW5V1ihwAsobyAxoDyGfbuE7GtCMIRKW+9u5RuY76mXA\/5Hek+T6FQOKzH3mr+v+JGJxVym\/FP+P+tojT4BBpnBqJCLfNDy2tVp6ilbnhuKgf\/77cPYvy\/pDQmLk+yTg9afBUS7btiSDFMd00gxdVYa8cP1XveH+H\/7+L\/0uw1R3S7ucll3WTmZi0QONBF9p9G\/+7MbmP\/3895t7+kZfNj4PeE9X5Oex1IHXJHp8XpcmjNBBpKIDwh3yfAyLp5bLnDRJf+\/h2c0N3clAHRiPe+LkOk5+DkW\/KfMa5x36gUl92OKaJtjfvn9t8896yvp0+b1qrxAcLRF4QvpQRuiDuOp9qMtAgT+\/wnFNcb\/UZO\/pkZRKm01PA8uv+9xPci13aCHdVxrUT6c4uy6OgReO7xr993\/3o83PvvcGbgffdFwYntPtdAR2OwInc4612z6csn0HR+B0Yn0HD8qr0KTTifUqHMXvYB9OJ9Z38KC8Ck06nVivwlH8DvbhdGJ9Bw\/Kq9Ck04n1KhzF72AfTifWd\/CgvApNOp1Yr8JR\/A724XRifQcPyqvQpNOJ9Socxe9gH04n1nfwoLwKTfp\/fdWsFbj6SnoAAAAASUVORK5CYII=\" alt=\"achromat triplet\" width=\"116\" height=\"150\" \/><\/p><p>Les lentilles triplet achromatiques repr\u00e9sentent une technologie optique avanc\u00e9e sp\u00e9cialement con\u00e7ue pour la correction efficace des aberrations chromatiques et d&#039;autres types d&#039;anomalies optiques. Ces lentilles sont compos\u00e9es de trois \u00e9l\u00e9ments de lentille distincts, g\u00e9n\u00e9ralement deux \u00e9l\u00e9ments constitu\u00e9s de mat\u00e9riaux \u00e0 indice de r\u00e9fraction \u00e9lev\u00e9 enfermant un \u00e9l\u00e9ment constitu\u00e9 d&#039;un mat\u00e9riau \u00e0 indice de r\u00e9fraction inf\u00e9rieur. Cette disposition r\u00e9duit non seulement consid\u00e9rablement les aberrations, notamment la distorsion et les aberrations sph\u00e9riques, mais fournit \u00e9galement des r\u00e9sultats d&#039;imagerie clairs et de haute qualit\u00e9.<\/p><p><b>Structure et principe de fonctionnement<\/b><\/p><p>Les lentilles triples achromatiques pr\u00e9sentent g\u00e9n\u00e9ralement une conception sym\u00e9trique \u00e0 trois \u00e9l\u00e9ments, compos\u00e9e de deux verres \u00e0 indice de r\u00e9fraction \u00e9lev\u00e9 (tels que le verre couronne) et d&#039;un verre \u00e0 faible indice de r\u00e9fraction (comme le verre silex) li\u00e9s ensemble par un processus d&#039;adh\u00e9sion pr\u00e9cis. Cette disposition structurelle permet \u00e0 l&#039;objectif de corriger efficacement l&#039;aberration chromatique et de r\u00e9duire davantage les aberrations, telles que la distorsion en coussin et l&#039;aberration sph\u00e9rique, gr\u00e2ce \u00e0 sa sym\u00e9trie.<\/p><p><b>Zone d&#039;application<\/b><\/p><p>Gr\u00e2ce \u00e0 leurs excellentes propri\u00e9t\u00e9s d\u2019imagerie, les lentilles triplet achromatiques sont largement utilis\u00e9es dans les domaines qui exigent une imagerie de haute qualit\u00e9. Il s\u2019agit notamment de la microscopie \u00e0 fluorescence, de la spectroscopie, de l\u2019inspection des surfaces et de l\u2019imagerie des sciences de la vie, entre autres. Les objectifs sont capables de fournir une excellente correction des couleurs et une qualit\u00e9 d\u2019image haute r\u00e9solution sur une large plage de longueurs d\u2019onde.<\/p><p><b>Avantages<\/b><\/p><ol><li><strong>Correction de l&#039;aberration chromatique<\/strong>: Les lentilles triples achromatiques peuvent ajuster avec pr\u00e9cision la lumi\u00e8re de diff\u00e9rentes longueurs d&#039;onde sur le m\u00eame plan focal, r\u00e9duisant consid\u00e9rablement l&#039;apparition d&#039;aberrations chromatiques.<\/li><li><strong>Aberrations r\u00e9duites<\/strong>: Gr\u00e2ce \u00e0 la conception sym\u00e9trique ing\u00e9nieuse et aux processus de fabrication pr\u00e9cis, les distorsions telles que la distorsion en coussinet et l&#039;aberration sph\u00e9rique sont efficacement contr\u00f4l\u00e9es et minimis\u00e9es.<\/li><li><strong>Imagerie haute r\u00e9solution<\/strong>: Ces objectifs offrent des solutions d&#039;imagerie haute d\u00e9finition et de haute qualit\u00e9 pour une vari\u00e9t\u00e9 d&#039;applications optiques de pr\u00e9cision.<\/li><\/ol><div>\u00a0<\/div><p><b>Mat\u00e9riaux et proc\u00e9d\u00e9s de fabrication<\/b><\/p><p>La production de lentilles triples achromatiques implique le collage pr\u00e9cis de lentilles fabriqu\u00e9es \u00e0 partir de diff\u00e9rents types de mat\u00e9riaux. Les mat\u00e9riaux de lentilles typiques comprennent le verre optique traditionnel, la silice fondue de qualit\u00e9 ultraviolette (JGS1), la silice fondue de qualit\u00e9 infrarouge (JGS3) et le fluorure de calcium (CaF2), entre autres. Les param\u00e8tres cl\u00e9s de la lentille, tels que le rayon de courbure, l&#039;\u00e9paisseur centrale et des bords, sont m\u00e9ticuleusement con\u00e7us pour garantir des performances optiques optimales.<\/p><p><b>Sp\u00e9cifications typiques<\/b><\/p><ul><li><strong>Mat\u00e9riaux de fabrication<\/strong>: Divers, y compris le verre optique, la silice fondue de qualit\u00e9 ultraviolette, la silice fondue de qualit\u00e9 infrarouge et le fluorure de calcium.<\/li><li><strong>Tol\u00e9rances dimensionnelles<\/strong>: G\u00e9n\u00e9ralement, \u00b10,03 mm pour les sp\u00e9cifications d&#039;usine standard, avec une fabrication de pr\u00e9cision atteignant \u00b10,01 mm.<\/li><li><strong>Tol\u00e9rance d&#039;\u00e9paisseur centrale<\/strong>: \u00b10,03 mm comme sp\u00e9cification d&#039;usine standard, avec des limites de fabrication atteignant \u00b10,02 mm.<\/li><li><strong>Rayon de tol\u00e9rance de courbure<\/strong>: \u00b10,3 % comme sp\u00e9cification d&#039;usine standard, avec des limites de fabrication atteignant \u00b10,2 %.<\/li><li><strong>Qualit\u00e9 de surface<\/strong>: Atteindre un niveau 20-10 selon les normes d&#039;usine, s&#039;am\u00e9liorer jusqu&#039;\u00e0 un niveau 10-5 pour des exigences plus \u00e9lev\u00e9es.<\/li><li><strong>Irr\u00e9gularit\u00e9<\/strong>: La norme commune est de 1\/5 Lambda, la limite pour des exigences plus \u00e9lev\u00e9es \u00e9tant inf\u00e9rieure \u00e0 1\/10 Lambda.<\/li><li><strong>D\u00e9viation de centrage<\/strong>: Dans des conditions normales d&#039;usine, le centrage peut \u00eatre contr\u00f4l\u00e9 dans un d\u00e9lai de 3 minutes d&#039;arc (Arcmin), avec des limites de fabrication se resserrant \u00e0 1 Arcmin.<\/li><\/ul><div>\u00a0<\/div><p>Les lentilles triples achromatiques jouent un r\u00f4le crucial dans les syst\u00e8mes optiques modernes, en particulier dans les applications n\u00e9cessitant une imagerie de haute pr\u00e9cision et une correction de l&#039;aberration chromatique. Leur conception et leur fabrication de haute qualit\u00e9 en font le choix privil\u00e9gi\u00e9 pour de nombreuses applications optiques avanc\u00e9es.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-26117ba e-flex e-con-boxed e-con e-parent\" data-id=\"26117ba\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-ef82057 elementor-widget elementor-widget-heading\" data-id=\"ef82057\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Lentilles asph\u00e9riques achromatiques<\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-138885f elementor-widget elementor-widget-text-editor\" data-id=\"138885f\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p><img loading=\"lazy\" decoding=\"async\" class=\"\" style=\"text-align: var(--text-align); font-size: 1rem;\" src=\"data:image\/png;base64,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\" alt=\"\" width=\"212\" height=\"106\" \/><\/p><p>Les lentilles asph\u00e9riques achromatiques fusionnent les avantages des lentilles asph\u00e9riques et achromatiques, cr\u00e9ant un composant optique sophistiqu\u00e9. Cette combinaison unique leur permet de fournir une qualit\u00e9 d\u2019image exceptionnelle et une correction pr\u00e9cise des aberrations chromatiques.<\/p><p><b>Structure et principe de fonctionnement<\/b><\/p><p>Ces lentilles sont g\u00e9n\u00e9ralement compos\u00e9es de la liaison de deux lentilles\u00a0: une lentille achromatique et une lentille asph\u00e9rique. La conception de la lentille asph\u00e9rique vise \u00e0 att\u00e9nuer les erreurs de front d&#039;onde produites par les lentilles sph\u00e9riques traditionnelles, obtenant ainsi une qualit\u00e9 d&#039;image plus pr\u00e9cise, r\u00e9duisant la taille du spot RMS et se rapprochant de la limite de diffraction.<\/p><p><b>Fabrication et s\u00e9lection des mat\u00e9riaux<\/b><\/p><p>G\u00e9n\u00e9ralement, ces lentilles sont fabriqu\u00e9es \u00e0 partir de polym\u00e8res photosensibles et de composants optiques en verre, le polym\u00e8re \u00e9tant appliqu\u00e9 sur une surface de la paire de lentilles coll\u00e9es. Cette m\u00e9thode permet non seulement de fabriquer les lentilles rapidement dans un d\u00e9lai court, mais offre \u00e9galement une flexibilit\u00e9 similaire aux assemblages multi-\u00e9l\u00e9ments traditionnels. Cependant, la plage de temp\u00e9ratures de fonctionnement des lentilles achromatiques asph\u00e9riques est assez \u00e9troite, limit\u00e9e de -20\u00b0C \u00e0 +80\u00b0C, et elles ne conviennent pas \u00e0 la transmission spectrale de l&#039;ultraviolet profond (DUV).<\/p><p><b>Avantages cl\u00e9s<\/b><\/p><ol><li><strong>Correction de l&#039;aberration chromatique<\/strong>: Ils corrigent efficacement l&#039;aberration chromatique, focalisant avec pr\u00e9cision la lumi\u00e8re de diff\u00e9rentes longueurs d&#039;onde sur le m\u00eame plan.<\/li><li><strong>R\u00e9duction des aberrations<\/strong>: Leur conception asph\u00e9rique r\u00e9duit consid\u00e9rablement l&#039;aberration sph\u00e9rique et les erreurs de front d&#039;onde, am\u00e9liorant ainsi la qualit\u00e9 de l&#039;image.<\/li><li><strong>Rentabilit\u00e9<\/strong>: Par rapport aux syst\u00e8mes optiques multi-\u00e9l\u00e9ments conventionnels, ces objectifs offrent un meilleur rapport qualit\u00e9-prix.<\/li><\/ol><div>\u00a0<\/div><p><b>Zone d&#039;application<\/b><\/p><p>Les lentilles asph\u00e9riques achromatiques sont largement utilis\u00e9es dans divers syst\u00e8mes optiques de haute pr\u00e9cision, tels que\u00a0:<\/p><ul><li>Focalisation ou collimation des fibres<\/li><li>Syst\u00e8mes de relais d&#039;imagerie<\/li><li>Syst\u00e8mes de d\u00e9tection et de num\u00e9risation<\/li><li>Syst\u00e8mes d&#039;imagerie \u00e0 haute ouverture num\u00e9rique<\/li><li>Extenseurs de faisceau laser<\/li><\/ul><div>\u00a0<\/div><p><b>Sp\u00e9cifications techniques<\/b><\/p><ul><li><strong>Mat\u00e9riaux<\/strong>: Polym\u00e8res photosensibles et lentilles optiques en verre<\/li><li><strong>Plage de temp\u00e9rature de fonctionnement<\/strong>: De -20\u00b0C \u00e0 +80\u00b0C<\/li><li><strong>Principales applications<\/strong>: Y compris la focalisation des fibres, les relais d&#039;imagerie, le balayage de d\u00e9tection et l&#039;imagerie \u00e0 haute ouverture num\u00e9rique, entre autres<\/li><\/ul><div>\u00a0<\/div><p>Gr\u00e2ce \u00e0 leur conception ing\u00e9nieuse et \u00e0 leur processus de fabrication efficace, les lentilles asph\u00e9riques achromatiques d\u00e9montrent des performances optiques exceptionnelles et un large spectre d&#039;applications, ce qui en fait un composant cl\u00e9 indispensable dans les syst\u00e8mes d&#039;optique et de vision de pr\u00e9cision modernes.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-4ec83c6 e-flex e-con-boxed e-con e-parent\" data-id=\"4ec83c6\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-563319c elementor-widget elementor-widget-heading\" data-id=\"563319c\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h2 class=\"elementor-heading-title elementor-size-default\">Comparaison de diff\u00e9rentes lentilles achromatiques<\/h2>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-45d378b elementor-widget elementor-widget-text-editor\" data-id=\"45d378b\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Le tableau suivant compare les caract\u00e9ristiques des diff\u00e9rents types de lentilles achromatiques :<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-f79d29c elementor-widget elementor-widget-elementskit-tablepress\" data-id=\"f79d29c\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"elementskit-tablepress.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<div class=\"elemenetskit-tablepress ekit-wid-con\" id=\"ekit_tablepress_f79d29c\">\n<table id=\"tablepress-44\" class=\"tablepress tablepress-id-44\">\n<thead>\n<tr class=\"row-1\">\n\t<th class=\"column-1\">Fonctionnalit\u00e9<\/th><th class=\"column-2\">Doublet achromatique<\/th><th class=\"column-3\">Triplet achromatique<\/th><th class=\"column-4\">Achromatique positif<\/th><th class=\"column-5\">Achromatique n\u00e9gatif<\/th>\n<\/tr>\n<\/thead>\n<tbody class=\"row-striping row-hover\">\n<tr class=\"row-2\">\n\t<td class=\"column-1\">Construction<\/td><td class=\"column-2\">2 \u00e9l\u00e9ments <\/td><td class=\"column-3\">3 \u00e9l\u00e9ments<\/td><td class=\"column-4\">Positif n\u00e9gatif<\/td><td class=\"column-5\">Positif n\u00e9gatif<\/td>\n<\/tr>\n<tr class=\"row-3\">\n\t<td class=\"column-1\">Correction de couleur<\/td><td class=\"column-2\">Bon (spectre limit\u00e9)<\/td><td class=\"column-3\">Excellent (spectre plus large)<\/td><td class=\"column-4\">Bon (spectre limit\u00e9)<\/td><td class=\"column-5\">N\/A (divergent)<\/td>\n<\/tr>\n<tr class=\"row-4\">\n\t<td class=\"column-1\">Ab\u00e9ration sph\u00e9rique<\/td><td class=\"column-2\">Pas adress\u00e9<\/td><td class=\"column-3\">Pas adress\u00e9<\/td><td class=\"column-4\">Pas adress\u00e9<\/td><td class=\"column-5\">Pas adress\u00e9<\/td>\n<\/tr>\n<tr class=\"row-5\">\n\t<td class=\"column-1\">Qualit\u00e9 d&#039;image<\/td><td class=\"column-2\">Bien<\/td><td class=\"column-3\">Excellent<\/td><td class=\"column-4\">Bien<\/td><td class=\"column-5\">N\/A (divergent)<\/td>\n<\/tr>\n<tr class=\"row-6\">\n\t<td class=\"column-1\">Applications<\/td><td class=\"column-2\">Microscopes, t\u00e9lescopes, cam\u00e9ras<\/td><td class=\"column-3\">Imagerie de haute pr\u00e9cision (astronomie)<\/td><td class=\"column-4\">Cam\u00e9ras, t\u00e9lescopes<\/td><td class=\"column-5\">T\u00e9l\u00e9m\u00e9trie laser, spectroscopie<\/td>\n<\/tr>\n<tr class=\"row-7\">\n\t<td class=\"column-1\">Co\u00fbt<\/td><td class=\"column-2\">Mod\u00e9r\u00e9<\/td><td class=\"column-3\">Haut<\/td><td class=\"column-4\">Mod\u00e9r\u00e9<\/td><td class=\"column-5\">Mod\u00e9r\u00e9<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<!-- #tablepress-44 from cache --><\/div>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-01b5676 elementor-widget elementor-widget-elementskit-tablepress\" data-id=\"01b5676\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"elementskit-tablepress.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<div class=\"elemenetskit-tablepress ekit-wid-con\" id=\"ekit_tablepress_01b5676\">\n<table id=\"tablepress-45\" class=\"tablepress tablepress-id-45\">\n<thead>\n<tr class=\"row-1\">\n\t<th class=\"column-1\">Fonctionnalit\u00e9<\/th><th class=\"column-2\">Cylindrique Achromatique<\/th><th class=\"column-3\">Paires achromatiques<\/th><th class=\"column-4\">Achromates asph\u00e9ris\u00e9s<\/th><th class=\"column-5\">Asph\u00e8res hybrides<\/th>\n<\/tr>\n<\/thead>\n<tbody class=\"row-striping row-hover\">\n<tr class=\"row-2\">\n\t<td class=\"column-1\">Construction<\/td><td class=\"column-2\">Forme cylindrique<\/td><td class=\"column-3\">Doublets assortis<\/td><td class=\"column-4\">Surfaces asph\u00e9riques<\/td><td class=\"column-5\">\u00c9l\u00e9ments asph\u00e9riques + autres types de lentilles<\/td>\n<\/tr>\n<tr class=\"row-3\">\n\t<td class=\"column-1\">Correction de couleur<\/td><td class=\"column-2\">Un plan (horizontal\/vertical)<\/td><td class=\"column-3\">Am\u00e9lior\u00e9 par rapport au Doublet simple<\/td><td class=\"column-4\">Excellent<\/td><td class=\"column-5\">Exceptionnel<\/td>\n<\/tr>\n<tr class=\"row-4\">\n\t<td class=\"column-1\">Ab\u00e9ration sph\u00e9rique<\/td><td class=\"column-2\">Pas adress\u00e9<\/td><td class=\"column-3\">Pas adress\u00e9<\/td><td class=\"column-4\">Corrig\u00e9e<\/td><td class=\"column-5\">Corrig\u00e9e<\/td>\n<\/tr>\n<tr class=\"row-5\">\n\t<td class=\"column-1\">Qualit\u00e9 d&#039;image<\/td><td class=\"column-2\">Mod\u00e9r\u00e9<\/td><td class=\"column-3\">Tr\u00e8s bien<\/td><td class=\"column-4\">Excellent<\/td><td class=\"column-5\">Sup\u00e9rieur<\/td>\n<\/tr>\n<tr class=\"row-6\">\n\t<td class=\"column-1\">Applications<\/td><td class=\"column-2\">Mise en forme du faisceau cylindrique, correction de l&#039;astigmatisme<\/td><td class=\"column-3\">Qualit\u00e9 d&#039;image am\u00e9lior\u00e9e<\/td><td class=\"column-4\">Imagerie haut de gamme<\/td><td class=\"column-5\">Imagerie haut de gamme<\/td>\n<\/tr>\n<tr class=\"row-7\">\n\t<td class=\"column-1\">Co\u00fbt<\/td><td class=\"column-2\">Mod\u00e9r\u00e9<\/td><td class=\"column-3\">Haut<\/td><td class=\"column-4\">Tr\u00e8s haut<\/td><td class=\"column-5\">Le plus \u00e9lev\u00e9<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<!-- #tablepress-45 from cache --><\/div>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-09e74ad e-flex e-con-boxed e-con e-parent\" data-id=\"09e74ad\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-587897a elementor-widget elementor-widget-heading\" data-id=\"587897a\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h2 class=\"elementor-heading-title elementor-size-default\">Achromates ciment\u00e9s ou espac\u00e9s d&#039;air<\/h2>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-25f269b elementor-widget elementor-widget-text-editor\" data-id=\"25f269b\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Les lentilles achromatiques r\u00e9duisent ou \u00e9liminent efficacement l&#039;aberration chromatique en combinant des mat\u00e9riaux en verre avec diff\u00e9rents indices de r\u00e9fraction et propri\u00e9t\u00e9s de dispersion. Ces lentilles sont principalement divis\u00e9es en deux types : ciment\u00e9es et espac\u00e9es d\u2019air. Vous trouverez ci-dessous une autre comparaison de ces deux types d\u2019objectifs\u00a0:<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-d32d01d elementor-widget elementor-widget-heading\" data-id=\"d32d01d\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Lentilles achromatiques ciment\u00e9es<\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-2a29fe1 elementor-widget elementor-widget-image\" data-id=\"2a29fe1\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"image.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<img loading=\"lazy\" decoding=\"async\" width=\"800\" height=\"693\" src=\"https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/cemented-achromatic.webp\" class=\"attachment-large size-large wp-image-35946\" alt=\"achromatique ciment\u00e9\" srcset=\"https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/cemented-achromatic.webp 896w, https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/cemented-achromatic-300x260.webp 300w, https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/cemented-achromatic-768x665.webp 768w, https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/cemented-achromatic-14x12.webp 14w\" sizes=\"(max-width: 800px) 100vw, 800px\" \/>\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-6446ad6 elementor-widget elementor-widget-text-editor\" data-id=\"6446ad6\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p><strong>Avantages :<\/strong><\/p><ul class=\"list-disc pl-8\"><li><strong>Pertes de r\u00e9flexion r\u00e9duites<\/strong>: En \u00e9liminant les pertes de r\u00e9flexion au niveau des deux interfaces air-verre, les lentilles ciment\u00e9es ont une efficacit\u00e9 de transmission lumineuse plus \u00e9lev\u00e9e.<\/li><li><strong>Structure compacte<\/strong>: Les lentilles ciment\u00e9es sont g\u00e9n\u00e9ralement plus petites et plus l\u00e9g\u00e8res, ce qui les rend adapt\u00e9es aux syst\u00e8mes optiques n\u00e9cessitant des conceptions compactes.<\/li><li><strong>Durabilit\u00e9<\/strong>: \u00c9tant donn\u00e9 que les \u00e9l\u00e9ments de la lentille sont coll\u00e9s ensemble, les lentilles ciment\u00e9es sont moins sujettes aux rayures et aux dommages physiques.<\/li><li><strong>Conception simplifi\u00e9e du chemin optique<\/strong>: La propagation de la lumi\u00e8re \u00e0 l&#039;int\u00e9rieur de la lentille peut ignorer le nombre de couches ciment\u00e9es, simplifiant ainsi la conception du chemin optique.<\/li><\/ul><p><strong>D\u00e9savantages:<\/strong><\/p><ul class=\"list-disc pl-8\"><li><strong>Probl\u00e8mes de dilatation thermique<\/strong>: Les diff\u00e9rences dans les coefficients de dilatation thermique des diff\u00e9rents mat\u00e9riaux de verre peuvent provoquer la fissuration ou la s\u00e9paration de la couche ciment\u00e9e avec les changements de temp\u00e9rature, en particulier dans les lentilles de grand diam\u00e8tre.<\/li><li><strong>Co\u00fbts de fabrication plus \u00e9lev\u00e9s<\/strong>: Les lentilles ciment\u00e9es n\u00e9cessitent des processus de fabrication de haute pr\u00e9cision pour garantir un bon alignement des \u00e9l\u00e9ments de la lentille, augmentant ainsi leurs co\u00fbts de fabrication.<\/li><li><strong>Aberration chromatique r\u00e9siduelle<\/strong>: Bien que les lentilles ciment\u00e9es r\u00e9duisent efficacement l&#039;aberration chromatique, une aberration chromatique r\u00e9siduelle peut encore appara\u00eetre sur les bords des images dans certains cas.<\/li><\/ul>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-818f770 elementor-widget elementor-widget-heading\" data-id=\"818f770\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h3 class=\"elementor-heading-title elementor-size-default\">Lentilles achromatiques espac\u00e9es dans l&#039;air\n<\/h3>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-f2f556c elementor-widget elementor-widget-image\" data-id=\"f2f556c\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"image.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<img loading=\"lazy\" decoding=\"async\" width=\"800\" height=\"778\" src=\"https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/air-spaced-achromatic.webp\" class=\"attachment-large size-large wp-image-35947\" alt=\"achromatique \u00e0 espacement d&#039;air\" srcset=\"https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/air-spaced-achromatic.webp 872w, https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/air-spaced-achromatic-300x292.webp 300w, https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/air-spaced-achromatic-768x747.webp 768w, https:\/\/chineselens.com\/wp-content\/uploads\/2024\/06\/air-spaced-achromatic-12x12.webp 12w\" sizes=\"(max-width: 800px) 100vw, 800px\" \/>\t\t\t\t\t\t\t\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-267ca58 elementor-widget elementor-widget-text-editor\" data-id=\"267ca58\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p><strong>Avantages :<\/strong><\/p><ul class=\"list-disc pl-8\"><li><strong>Meilleure correction des aberrations<\/strong>: La conception \u00e0 espacement d&#039;air offre plus de libert\u00e9 de conception, aidant \u00e0 corriger plus efficacement les aberrations telles que les aberrations sph\u00e9riques et de coma.<\/li><li><strong>R\u00e9sistance sup\u00e9rieure aux dommages laser<\/strong>: Sans utilisation d&#039;adh\u00e9sifs, les lentilles espac\u00e9es d&#039;air ont une meilleure r\u00e9sistance aux dommages pour les applications laser haute puissance.<\/li><li><strong>Meilleure stabilit\u00e9 thermique<\/strong>: Les lentilles \u00e0 espacement d&#039;air sont moins affect\u00e9es par la dilatation thermique du mat\u00e9riau avec les changements de temp\u00e9rature, ce qui les rend adapt\u00e9es aux lentilles de grand diam\u00e8tre.<\/li><\/ul><p><strong>D\u00e9savantages:<\/strong><\/p><ul class=\"list-disc pl-8\"><li><strong>Augmentation des pertes par r\u00e9flexion<\/strong>: Les interfaces air-verre dans les lentilles espac\u00e9es d&#039;air augmentent les pertes par r\u00e9flexion, n\u00e9cessitant potentiellement des rev\u00eatements antireflet suppl\u00e9mentaires.<\/li><li><strong>Structure plus complexe<\/strong>: La conception et la fabrication sont plus complexes, n\u00e9cessitant un espacement et un alignement pr\u00e9cis des \u00e9l\u00e9ments de la lentille.<\/li><li><strong>Taille et poids accrus<\/strong>: Pour maintenir l&#039;espacement d&#039;air entre les \u00e9l\u00e9ments de la lentille, les lentilles espac\u00e9es d&#039;air sont souvent plus grandes et plus lourdes que les lentilles ciment\u00e9es.<\/li><\/ul>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-ff25546 elementor-widget elementor-widget-text-editor\" data-id=\"ff25546\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Les lentilles achromatiques ciment\u00e9es et les lentilles achromatiques \u00e0 espacement d&#039;air ont chacune leurs avantages et inconv\u00e9nients uniques. Les lentilles ciment\u00e9es conviennent aux applications n\u00e9cessitant une conception compacte et une efficacit\u00e9 de transmission lumineuse \u00e9lev\u00e9e, tandis que les lentilles \u00e0 espacement d&#039;air montrent leurs avantages dans l&#039;utilisation d&#039;un laser haute puissance ou dans des sc\u00e9narios n\u00e9cessitant une correction plus pr\u00e9cise des aberrations. La prise en compte des besoins sp\u00e9cifiques de l&#039;application et du rapport co\u00fbt-performance peut aider \u00e0 d\u00e9terminer le type d&#039;objectif \u00e0 choisir.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-1fce2c4 elementor-widget elementor-widget-elementskit-tablepress\" data-id=\"1fce2c4\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"elementskit-tablepress.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<div class=\"elemenetskit-tablepress ekit-wid-con\" id=\"ekit_tablepress_1fce2c4\">\n<table id=\"tablepress-47\" class=\"tablepress tablepress-id-47\">\n<thead>\n<tr class=\"row-1\">\n\t<th class=\"column-1\">Fonctionnalit\u00e9<\/th><th class=\"column-2\">Achromat ciment\u00e9<\/th><th class=\"column-3\">Achromat \u00e0 espacement a\u00e9rien<\/th>\n<\/tr>\n<\/thead>\n<tbody class=\"row-striping row-hover\">\n<tr class=\"row-2\">\n\t<td class=\"column-1\">Construction<\/td><td class=\"column-2\">Deux ou trois \u00e9l\u00e9ments coll\u00e9s ensemble<\/td><td class=\"column-3\">Deux ou trois \u00e9l\u00e9ments s\u00e9par\u00e9s par un entrefer<\/td>\n<\/tr>\n<tr class=\"row-3\">\n\t<td class=\"column-1\">Avantages<\/td><td class=\"column-2\">* Compact et l\u00e9ger * Co\u00fbt r\u00e9duit * Plus facile \u00e0 fabriquer<\/td><td class=\"column-3\">* Qualit\u00e9 d&#039;image sup\u00e9rieure (r\u00e9flexions internes r\u00e9duites) * Plus de libert\u00e9 de conception pour la correction des aberrations * Moins sujet \u00e0 la bu\u00e9e<\/td>\n<\/tr>\n<tr class=\"row-4\">\n\t<td class=\"column-1\">D\u00e9savantages<\/td><td class=\"column-2\">* R\u00e9flexions internes plus \u00e9lev\u00e9es (peuvent provoquer des images fant\u00f4mes) * Libert\u00e9 de conception limit\u00e9e pour la correction des aberrations * Plus susceptible d&#039;\u00eatre endommag\u00e9 par les changements de temp\u00e9rature (en raison des diff\u00e9rents taux d&#039;expansion des verres)<\/td><td class=\"column-3\">* Plus grand et plus lourd * Co\u00fbt plus \u00e9lev\u00e9 * Plus complexe \u00e0 fabriquer<\/td>\n<\/tr>\n<tr class=\"row-5\">\n\t<td class=\"column-1\">Applications<\/td><td class=\"column-2\">* Solution \u00e9conomique pour la correction des couleurs de base * Appareils photo (en particulier les mod\u00e8les compacts) * T\u00e9lescopes (entr\u00e9e de gamme) * Microscopes (niveau \u00e9tudiant)<\/td><td class=\"column-3\">* Syst\u00e8mes d&#039;imagerie haute performance * T\u00e9lescopes astronomiques * Microscopes haut de gamme * Applications laser<\/td>\n<\/tr>\n<tr class=\"row-6\">\n\t<td class=\"column-1\">Co\u00fbt<\/td><td class=\"column-2\">Inf\u00e9rieur<\/td><td class=\"column-3\">Plus haut<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<!-- #tablepress-47 from cache --><\/div>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-2bef683 e-flex e-con-boxed e-con e-parent\" data-id=\"2bef683\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-1474119 elementor-widget elementor-widget-heading\" data-id=\"1474119\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h2 class=\"elementor-heading-title elementor-size-default\">Des indicateurs de performance<\/h2>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-4f2cbd9 elementor-widget elementor-widget-text-editor\" data-id=\"4f2cbd9\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Lors de la s\u00e9lection de lentilles achromatiques, il est crucial de se concentrer sur les indicateurs de performance suivants pour garantir que la lentille r\u00e9pond aux exigences sp\u00e9cifiques de l&#039;application\u00a0:<\/p><ul class=\"list-disc pl-8\"><li><strong>Capacit\u00e9 de correction de l&#039;aberration chromatique<\/strong>: La t\u00e2che principale d&#039;une lentille achromatique est de corriger l&#039;aberration chromatique, en garantissant que la lumi\u00e8re de diff\u00e9rentes longueurs d&#039;onde puisse se concentrer au m\u00eame point. Cette capacit\u00e9 est un indicateur cl\u00e9 des performances de l\u2019objectif.<\/li><li><strong>Transmission<\/strong>: La transmission d&#039;une lentille affecte directement la perte d&#039;\u00e9nergie de la lumi\u00e8re qui la traverse. Une transmission \u00e9lev\u00e9e indique que la lentille peut transmettre la lumi\u00e8re plus efficacement, r\u00e9duisant ainsi les pertes.<\/li><li><strong>Distorsion du front d&#039;onde<\/strong>: La distorsion du front d&#039;onde d\u00e9crit le degr\u00e9 de d\u00e9formation du front d&#039;onde apr\u00e8s que la lumi\u00e8re traverse la lentille. Les objectifs avec une distorsion de front d&#039;onde plus faible peuvent mieux conserver le front d&#039;onde d&#039;origine de la lumi\u00e8re, am\u00e9liorant ainsi la qualit\u00e9 de l&#039;image.<\/li><li><strong>Mat\u00e9riaux et rev\u00eatements<\/strong>: Les mat\u00e9riaux et les rev\u00eatements de surface utilis\u00e9s dans la lentille ont un impact significatif sur ses performances. Les verres fabriqu\u00e9s \u00e0 partir de mat\u00e9riaux de haute qualit\u00e9 et de rev\u00eatements appropri\u00e9s ont g\u00e9n\u00e9ralement une durabilit\u00e9, des propri\u00e9t\u00e9s antireflet et une adaptabilit\u00e9 environnementale plus \u00e9lev\u00e9es.<\/li><li><strong>Distance focale et ouverture num\u00e9rique (NA)<\/strong>: La distance focale est li\u00e9e au grossissement et \u00e0 la distance de travail de l&#039;objectif, tandis que l&#039;ouverture num\u00e9rique est associ\u00e9e \u00e0 la r\u00e9solution et \u00e0 la capacit\u00e9 de collecte de lumi\u00e8re de l&#039;objectif.<\/li><li><strong>La taille et la forme<\/strong>: La taille et la forme de la lentille doivent \u00eatre s\u00e9lectionn\u00e9es en fonction des exigences sp\u00e9cifiques de l&#039;application afin de garantir la compatibilit\u00e9 avec le syst\u00e8me optique utilis\u00e9.<\/li><\/ul>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-cd4e600 elementor-widget elementor-widget-elementskit-tablepress\" data-id=\"cd4e600\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"elementskit-tablepress.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<div class=\"elemenetskit-tablepress ekit-wid-con\" id=\"ekit_tablepress_cd4e600\">\n<table id=\"tablepress-46\" class=\"tablepress tablepress-id-46\">\n<thead>\n<tr class=\"row-1\">\n\t<th class=\"column-1\">Indicateur de performance<\/th><th class=\"column-2\">Description<\/th><th class=\"column-3\">Importance<\/th>\n<\/tr>\n<\/thead>\n<tbody class=\"row-striping row-hover\">\n<tr class=\"row-2\">\n\t<td class=\"column-1\">Distance focale<\/td><td class=\"column-2\">Distance entre le centre de la lentille et l&#039;endroit o\u00f9 converge la lumi\u00e8re parall\u00e8le<\/td><td class=\"column-3\">D\u00e9termine le grossissement et la distance de travail<\/td>\n<\/tr>\n<tr class=\"row-3\">\n\t<td class=\"column-1\">Ouverture efficace<\/td><td class=\"column-2\">Diam\u00e8tre de l&#039;ouverture libre pour le passage de la lumi\u00e8re<\/td><td class=\"column-3\">Affecte la collecte de lumi\u00e8re et la profondeur de champ<\/td>\n<\/tr>\n<tr class=\"row-4\">\n\t<td class=\"column-1\">Correction de couleur<\/td><td class=\"column-2\">Capacit\u00e9 \u00e0 minimiser l&#039;aberration chromatique (mise au point de diff\u00e9rentes longueurs d&#039;onde \u00e0 diff\u00e9rentes distances)<\/td><td class=\"column-3\">Crucial pour minimiser les franges de couleur<\/td>\n<\/tr>\n<tr class=\"row-5\">\n\t<td class=\"column-1\">R\u00e9solution de l&#039;image<\/td><td class=\"column-2\">Niveau de d\u00e9tail captur\u00e9 dans l&#039;image form\u00e9e<\/td><td class=\"column-3\">Impacte la nettet\u00e9, le contraste et la qualit\u00e9 globale de l\u2019image<\/td>\n<\/tr>\n<tr class=\"row-6\">\n\t<td class=\"column-1\">Transmission<\/td><td class=\"column-2\">Pourcentage de lumi\u00e8re traversant la lentille<\/td><td class=\"column-3\">Une transmission plus \u00e9lev\u00e9e conduit \u00e0 des images plus lumineuses et \u00e0 de meilleures performances dans des conditions de faible luminosit\u00e9<\/td>\n<\/tr>\n<tr class=\"row-7\">\n\t<td class=\"column-1\">Distorsion<\/td><td class=\"column-2\">Comment les lignes droites sont \u00e9tir\u00e9es ou pli\u00e9es dans l&#039;image<\/td><td class=\"column-3\">Critique pour des applications telles que la photographie architecturale et la photogramm\u00e9trie<\/td>\n<\/tr>\n<tr class=\"row-8\">\n\t<td class=\"column-1\">Qualit\u00e9 de surface<\/td><td class=\"column-2\">Qualit\u00e9 de la finition de la surface de la lentille<\/td><td class=\"column-3\">Les rayures, les piq\u00fbres ou les rev\u00eatements in\u00e9gaux d\u00e9gradent la qualit\u00e9 de l&#039;image<\/td>\n<\/tr>\n<tr class=\"row-9\">\n\t<td class=\"column-1\">Propri\u00e9t\u00e9s mat\u00e9rielles<\/td><td class=\"column-2\">Propri\u00e9t\u00e9s du verre utilis\u00e9 (indice de r\u00e9fraction, dispersion, etc.)<\/td><td class=\"column-3\">Influence la correction des couleurs, la transmission et la durabilit\u00e9<\/td>\n<\/tr>\n<tr class=\"row-10\">\n\t<td class=\"column-1\">Taille et poids<\/td><td class=\"column-2\">Dimensions physiques et poids de l&#039;objectif<\/td><td class=\"column-3\">Important pour la portabilit\u00e9 et les limitations d&#039;espace<\/td>\n<\/tr>\n<tr class=\"row-11\">\n\t<td class=\"column-1\">Co\u00fbt<\/td><td class=\"column-2\">Prix \u200b\u200bde la lentille achromatique<\/td><td class=\"column-3\">Il est crucial d\u2019\u00e9quilibrer les besoins de performance avec le budget<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<!-- #tablepress-46 from cache --><\/div>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-25411c5 e-flex e-con-boxed e-con e-parent\" data-id=\"25411c5\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-7196900 elementor-widget elementor-widget-heading\" data-id=\"7196900\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h2 class=\"elementor-heading-title elementor-size-default\">Applications des lentilles achromatiques<\/h2>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-da07fea elementor-widget elementor-widget-text-editor\" data-id=\"da07fea\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Les lentilles achromatiques jouent un r\u00f4le crucial dans de nombreux domaines en raison de leurs excellentes capacit\u00e9s de correction de l&#039;aberration chromatique, am\u00e9liorant consid\u00e9rablement la qualit\u00e9 d&#039;image et les performances globales des syst\u00e8mes optiques. Les principaux domaines d&#039;application comprennent\u00a0:<\/p><ul class=\"list-disc pl-8\"><li><strong>Syst\u00e8mes d&#039;imagerie optique<\/strong>: Dans les appareils tels que les microscopes, les t\u00e9lescopes et les appareils photo, les lentilles achromatiques r\u00e9duisent efficacement les aberrations chromatiques et sph\u00e9riques, fournissant des images plus claires.<\/li><li><strong>Photographie et vid\u00e9ographie<\/strong>: En corrigeant les aberrations chromatiques, les lentilles achromatiques assurent une reproduction pr\u00e9cise des couleurs dans les photos et les vid\u00e9os, ce qui donne des images plus r\u00e9alistes et naturelles.<\/li><li><strong>Syst\u00e8mes laser<\/strong>: Les lentilles achromatiques sont utilis\u00e9es dans la focalisation et la transmission laser, r\u00e9duisant l&#039;impact des aberrations chromatiques sur la qualit\u00e9 du laser, am\u00e9liorant ainsi la pr\u00e9cision et l&#039;efficacit\u00e9 globales du syst\u00e8me.<\/li><li><strong>Communications par fibre optique<\/strong>: Les lentilles achromatiques aident \u00e0 r\u00e9duire les effets de dispersion, am\u00e9liorant ainsi la qualit\u00e9 et la stabilit\u00e9 de la transmission du signal, ce qui est crucial pour la technologie de communication par fibre optique.<\/li><li><strong>Recherche scientifique<\/strong>: Dans les instruments scientifiques tels que les spectrom\u00e8tres et les interf\u00e9rom\u00e8tres, les lentilles achromatiques am\u00e9liorent la pr\u00e9cision des mesures, am\u00e9liorant ainsi la fiabilit\u00e9 et la pr\u00e9cision des donn\u00e9es.<\/li><li><strong>Inspection industrielle et vision industrielle<\/strong>: Dans ce domaine, les lentilles achromatiques am\u00e9liorent la clart\u00e9 et la pr\u00e9cision de l&#039;image, optimisant ainsi l&#039;efficacit\u00e9 des processus d&#039;inspection et de reconnaissance.<\/li><\/ul>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-8840d35 elementor-widget elementor-widget-text-editor\" data-id=\"8840d35\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>La performance exceptionnelle des lentilles achromatiques dans la r\u00e9duction des aberrations chromatiques et autres a consid\u00e9rablement fait progresser la technologie optique moderne. Le large \u00e9ventail de domaines d&#039;application d\u00e9montre la contribution significative des lentilles achromatiques \u00e0 l&#039;am\u00e9lioration des performances et de la qualit\u00e9 d&#039;imagerie de divers syst\u00e8mes optiques.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-9ec4842 e-flex e-con-boxed e-con e-parent\" data-id=\"9ec4842\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-a0f9001 elementor-widget elementor-widget-heading\" data-id=\"a0f9001\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h2 class=\"elementor-heading-title elementor-size-default\">Facteurs de prix pour l\u2019achat en gros et la personnalisation d\u2019\u00e9l\u00e9ments de lentilles achromatiques\n<\/h2>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-6647ad3 elementor-widget elementor-widget-text-editor\" data-id=\"6647ad3\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Lorsqu&#039;il s&#039;agit d&#039;achat en gros et de personnalisation de lentilles achromatiques, le prix est principalement d\u00e9termin\u00e9 par les facteurs suivants :<\/p><ul class=\"list-disc pl-8\"><li><strong>Qualit\u00e9 des mat\u00e9riaux<\/strong>: Les lentilles achromatiques sont g\u00e9n\u00e9ralement fabriqu\u00e9es \u00e0 partir de verre silex \u00e0 indice de r\u00e9fraction \u00e9lev\u00e9 et de verre couronne \u00e0 faible indice de r\u00e9fraction. La qualit\u00e9 de ces mat\u00e9riaux est un facteur cl\u00e9 affectant les performances et le prix des objectifs, le verre optique de meilleure qualit\u00e9 \u00e9tant plus cher.<\/li><li><strong>Pr\u00e9cision de fabrication<\/strong>: Un traitement et un assemblage de haute pr\u00e9cision sont cruciaux pour la fabrication de lentilles achromatiques, impliquant des param\u00e8tres tels que la forme de la surface de la lentille, le centrage et la finition de surface. Plus la pr\u00e9cision de la lentille est \u00e9lev\u00e9e, plus le co\u00fbt de fabrication est \u00e9lev\u00e9.<\/li><li><strong>Taille de l&#039;objectif et distance focale<\/strong>: Le diam\u00e8tre et la focale de l\u2019objectif impactent consid\u00e9rablement le prix. Les objectifs de plus grand diam\u00e8tre et de plus longue distance focale n\u00e9cessitent plus de mat\u00e9riaux et un processus de fabrication plus complexe, ce qui les rend plus chers.<\/li><li><strong>Rev\u00eatements optiques<\/strong>: Les rev\u00eatements optiques qui am\u00e9liorent la transmission de la lentille et les propri\u00e9t\u00e9s antireflet sont \u00e9galement un facteur de co\u00fbt. Les rev\u00eatements multicouches hautes performances sont plus chers que les rev\u00eatements monocouches.<\/li><li><strong>Exigences de personnalisation<\/strong>: Les objectifs personnalis\u00e9s pour des besoins d&#039;application sp\u00e9cifiques impliquent g\u00e9n\u00e9ralement des co\u00fbts de conception, de test et de production suppl\u00e9mentaires, ce qui rend les objectifs personnalis\u00e9s plus chers que les produits standard.<\/li><li><strong>Achats en gros<\/strong>: La production \u00e0 grande \u00e9chelle peut r\u00e9duire le co\u00fbt par lentille en r\u00e9partissant les co\u00fbts fixes. Cependant, les co\u00fbts initiaux de moulage et d\u2019installation peuvent \u00eatre \u00e9lev\u00e9s.<\/li><\/ul>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-50f88d2 elementor-widget elementor-widget-text-editor\" data-id=\"50f88d2\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Dans le processus d&#039;approvisionnement, il est essentiel de prendre en compte des facteurs tels que la qualit\u00e9 des mat\u00e9riaux, la pr\u00e9cision de la fabrication, la taille et la distance focale des lentilles, les rev\u00eatements optiques, les exigences de personnalisation et les achats en gros pour s\u00e9lectionner des lentilles achromatiques qui r\u00e9pondent aux besoins et au budget d&#039;applications sp\u00e9cifiques.<\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t<div class=\"elementor-element elementor-element-ee2a96b e-flex e-con-boxed e-con e-parent\" data-id=\"ee2a96b\" data-element_type=\"container\" data-e-type=\"container\">\n\t\t\t\t\t<div class=\"e-con-inner\">\n\t\t\t\t<div class=\"elementor-element elementor-element-ea3af1e elementor-widget elementor-widget-heading\" data-id=\"ea3af1e\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"heading.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t<h2 class=\"elementor-heading-title elementor-size-default\">R\u00e9sum\u00e9<\/h2>\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<div class=\"elementor-element elementor-element-cadbf6a elementor-widget elementor-widget-text-editor\" data-id=\"cadbf6a\" data-element_type=\"widget\" data-e-type=\"widget\" data-widget_type=\"text-editor.default\">\n\t\t\t\t<div class=\"elementor-widget-container\">\n\t\t\t\t\t\t\t\t\t<p>Vous recherchez un fabricant de lentilles achromatiques rentable\u00a0? Pensez \u00e0 Chineselens Optics, une soci\u00e9t\u00e9 d&#039;optique leader bas\u00e9e en Chine. Nous sommes sp\u00e9cialis\u00e9s dans la fabrication de lentilles achromatiques pour une large gamme d&#039;applications, notamment\u00a0: les objectifs d&#039;appareil photo, les t\u00e9lescopes et les microscopes. Chineselens Optics s&#039;est b\u00e2ti une r\u00e9putation dans l&#039;industrie pour ses prix abordables et la qualit\u00e9 sup\u00e9rieure de ses produits.<br \/>Que ce soit pour votre projet de recherche scientifique, votre passe-temps photographique, votre instrumentation ou toute situation o\u00f9 une imagerie pr\u00e9cise est requise, nos lentilles achromatiques vous offriront une excellente correction des couleurs et une excellente clart\u00e9 d&#039;image. Choisissez Chineselens Optics pour des solutions et des services optiques de qualit\u00e9 qui aideront vos projets et produits \u00e0 atteindre de nouveaux sommets. <strong><em><a href=\"https:\/\/chineselens.com\/fr\/optical-lens-manufacturer\/#lenscontact\" target=\"_blank\" rel=\"noopener\">Contactez nos experts d\u00e8s aujourd\u2019hui pour une consultation !<\/a><\/em><\/strong><\/p>\t\t\t\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t\t<\/div>\n\t\t\t\t<\/div>\n\t\t\t\t<\/div>","protected":false},"excerpt":{"rendered":"<p>Les lentilles achromatiques r\u00e9duisent l&#039;aberration chromatique, utilis\u00e9es dans les appareils photo, les t\u00e9lescopes et les microscopes. Achetez des lentilles achromatiques de haute qualit\u00e9 ou apprenez-en plus\u00a0!<\/p>","protected":false},"author":1,"featured_media":29829,"comment_status":"closed","ping_status":"closed","sticky":false,"template":"","format":"standard","meta":{"_acf_changed":false,"_seopress_titles_title":"Achromatic Lenses Guides of Knowledge, Cost and Manufactures","_seopress_titles_desc":"Achromatic lenses reduces chromatic aberration, used in cameras, telescopes & microscopes. Purchase high-quality achromatic lenses or learn more!","_seopress_robots_index":"","_seopress_robots_follow":"","_seopress_robots_imageindex":"","_seopress_robots_snippet":"","_seopress_robots_primary_cat":"none","_seopress_robots_breadcrumbs":"","_seopress_robots_freeze_modified_date":"","_seopress_robots_custom_modified_date":"","_seopress_robots_canonical":"","_seopress_social_fb_title":"","_seopress_social_fb_desc":"","_seopress_social_fb_img":"","_seopress_social_fb_img_attachment_id":0,"_seopress_social_fb_img_width":0,"_seopress_social_fb_img_height":0,"_seopress_social_twitter_title":"","_seopress_social_twitter_desc":"","_seopress_social_twitter_img":"","_seopress_social_twitter_img_attachment_id":0,"_seopress_social_twitter_img_width":0,"_seopress_social_twitter_img_height":0,"_seopress_redirections_value":"","_seopress_redirections_enabled":"","_seopress_redirections_enabled_regex":"","_seopress_redirections_logged_status":"both","_seopress_redirections_param":"","_seopress_redirections_type":301,"_seopress_analysis_target_kw":"","_seopress_news_disabled":"","_seopress_video_disabled":"","_seopress_video":[],"_seopress_pro_schemas_manual":[],"_seopress_pro_rich_snippets_disable_all":"","_seopress_pro_rich_snippets_disable":[],"_seopress_pro_schemas":[],"footnotes":""},"categories":[186],"tags":[229],"class_list":["post-35813","post","type-post","status-publish","format-standard","has-post-thumbnail","category-optical-lens","tag-achromatic-lens"],"acf":[],"_links":{"self":[{"href":"https:\/\/chineselens.com\/fr\/wp-json\/wp\/v2\/posts\/35813","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/chineselens.com\/fr\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/chineselens.com\/fr\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/chineselens.com\/fr\/wp-json\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"https:\/\/chineselens.com\/fr\/wp-json\/wp\/v2\/comments?post=35813"}],"version-history":[{"count":0,"href":"https:\/\/chineselens.com\/fr\/wp-json\/wp\/v2\/posts\/35813\/revisions"}],"wp:featuredmedia":[{"embeddable":true,"href":"https:\/\/chineselens.com\/fr\/wp-json\/wp\/v2\/media\/29829"}],"wp:attachment":[{"href":"https:\/\/chineselens.com\/fr\/wp-json\/wp\/v2\/media?parent=35813"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/chineselens.com\/fr\/wp-json\/wp\/v2\/categories?post=35813"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/chineselens.com\/fr\/wp-json\/wp\/v2\/tags?post=35813"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}